Orientably-regular maps with rotation group of order up to 400 -------------------------------------------------------------- Below is a complete list of all orientably-regular maps (on closed surfaces) with rotation group of order at most 400. Here the "rotation group" is the group of all orientation-preserving automorphisms of the map. The list is ordered according to the place of the rotation group in the "small groups" database (as used in GAP and MAGMA). For every such group G that occurs, the number of orientably-regular maps with rotation group G is given, and then for every such map M, the list gives * the genus of the map, * its label (see below), * its type {p,q} (where p is the face-size (or co-valency) and q is the valency of the map), plus * an indication of whether the map is reflexible or chiral, and * if p = q then an indication of whether the map is self-dual or non-self-dual (or mirror-self-dual inn the case of some chiral maps). The label of each map is consistent with the notation for the map at one of the following two webpages, where further details about the maps are available: * www.math.auckland.ac.nz/~conder/OrientableRegularMaps101.txt * www.math.auckland.ac.nz/~conder/ChiralMaps101.txt. In particular, a label of the form Rg.k indicates a fully regular map on an orientable surface of genus g, and Rg.k* indicates its dual, while Cg.k and Cg.k* indicate a chiral map on an orientable surface of genus g and its dual, and Cg.k# and Cg.k*# indicate their mirror images. Marston Conder April 2022 ............................................................................... Groups of order 4 Total = 2 Group <4,1> Number of orientably-regular maps = 1 Genus 1 map R1.13 of type {4,4} Reflexible Self-dual Group <4,2> Number of orientably-regular maps = 1 Genus 0 map R0.1 of type {2,2} Reflexible Self-dual ............................................................................... Groups of order 6 Total = 2 Group <6,1> Number of orientably-regular maps = 2 Genus 0 map R0.2 of type {2,3} Reflexible Genus 0 map R0.2* of type {3,2} Reflexible Group <6,2> Number of orientably-regular maps = 2 Genus 1 map R1.1 of type {3,6} Reflexible Genus 1 map R1.1* of type {6,3} Reflexible ............................................................................... Groups of order 8 Total = 5 Group <8,1> Number of orientably-regular maps = 1 Genus 2 map R2.6 of type {8,8} Reflexible Self-dual Group <8,2> Number of orientably-regular maps = 1 Genus 1 map R1.14 of type {4,4} Reflexible Self-dual Group <8,3> Number of orientably-regular maps = 2 Genus 0 map R0.3 of type {2,4} Reflexible Genus 0 map R0.3* of type {4,2} Reflexible ............................................................................... Groups of order 10 Total = 2 Group <10,1> Number of orientably-regular maps = 2 Genus 0 map R0.4 of type {2,5} Reflexible Genus 0 map R0.4* of type {5,2} Reflexible Group <10,2> Number of orientably-regular maps = 2 Genus 2 map R2.4 of type {5,10} Reflexible Genus 2 map R2.4* of type {10,5} Reflexible ............................................................................... Groups of order 12 Total = 5 Group <12,2> Number of orientably-regular maps = 1 Genus 3 map R3.12 of type {12,12} Reflexible Self-dual Group <12,3> Number of orientably-regular maps = 1 Genus 0 map R0.200 of type {3,3} Reflexible Self-dual Group <12,4> Number of orientably-regular maps = 2 Genus 0 map R0.5 of type {2,6} Reflexible Genus 0 map R0.5* of type {6,2} Reflexible Group <12,5> Number of orientably-regular maps = 1 Genus 2 map R2.5 of type {6,6} Reflexible Self-dual ............................................................................... Groups of order 14 Total = 2 Group <14,1> Number of orientably-regular maps = 2 Genus 0 map R0.6 of type {2,7} Reflexible Genus 0 map R0.6* of type {7,2} Reflexible Group <14,2> Number of orientably-regular maps = 2 Genus 3 map R3.9 of type {7,14} Reflexible Genus 3 map R3.9* of type {14,7} Reflexible ............................................................................... Groups of order 16 Total = 14 Group <16,1> Number of orientably-regular maps = 1 Genus 4 map R4.12 of type {16,16} Reflexible Self-dual Group <16,3> Number of orientably-regular maps = 1 Genus 1 map R1.15 of type {4,4} Reflexible Self-dual Group <16,5> Number of orientably-regular maps = 1 Genus 3 map R3.11 of type {8,8} Reflexible Self-dual Group <16,6> Number of orientably-regular maps = 1 Genus 3 map R3.10 of type {8,8} Reflexible Self-dual Group <16,7> Number of orientably-regular maps = 2 Genus 0 map R0.7 of type {2,8} Reflexible Genus 0 map R0.7* of type {8,2} Reflexible Group <16,8> Number of orientably-regular maps = 2 Genus 2 map R2.3 of type {4,8} Reflexible Genus 2 map R2.3* of type {8,4} Reflexible ............................................................................... Groups of order 18 Total = 5 Group <18,1> Number of orientably-regular maps = 2 Genus 0 map R0.8 of type {2,9} Reflexible Genus 0 map R0.8* of type {9,2} Reflexible Group <18,2> Number of orientably-regular maps = 2 Genus 4 map R4.10 of type {9,18} Reflexible Genus 4 map R4.10* of type {18,9} Reflexible Group <18,3> Number of orientably-regular maps = 2 Genus 1 map R1.2 of type {3,6} Reflexible Genus 1 map R1.2* of type {6,3} Reflexible ............................................................................... Groups of order 20 Total = 5 Group <20,2> Number of orientably-regular maps = 1 Genus 5 map R5.16 of type {20,20} Reflexible Self-dual Group <20,3> Number of orientably-regular maps = 2 Genus 1 map C1.15 of type {4,4} Chiral Self-dual Genus 1 map C1.15# of type {4,4} Chiral Self-dual Group <20,4> Number of orientably-regular maps = 2 Genus 0 map R0.9 of type {2,10} Reflexible Genus 0 map R0.9* of type {10,2} Reflexible Group <20,5> Number of orientably-regular maps = 1 Genus 4 map R4.11 of type {10,10} Reflexible Self-dual ............................................................................... Groups of order 22 Total = 2 Group <22,1> Number of orientably-regular maps = 2 Genus 0 map R0.10 of type {2,11} Reflexible Genus 0 map R0.10* of type {11,2} Reflexible Group <22,2> Number of orientably-regular maps = 2 Genus 5 map R5.14 of type {11,22} Reflexible Genus 5 map R5.14* of type {22,11} Reflexible ............................................................................... Groups of order 24 Total = 15 Group <24,2> Number of orientably-regular maps = 1 Genus 6 map R6.13 of type {24,24} Reflexible Self-dual Group <24,5> Number of orientably-regular maps = 2 Genus 3 map R3.7 of type {4,12} Reflexible Genus 3 map R3.7* of type {12,4} Reflexible Group <24,6> Number of orientably-regular maps = 2 Genus 0 map R0.11 of type {2,12} Reflexible Genus 0 map R0.11* of type {12,2} Reflexible Group <24,8> Number of orientably-regular maps = 2 Genus 2 map R2.2 of type {4,6} Reflexible Genus 2 map R2.2* of type {6,4} Reflexible Group <24,9> Number of orientably-regular maps = 1 Genus 5 map R5.15 of type {12,12} Reflexible Self-dual Group <24,10> Number of orientably-regular maps = 2 Genus 4 map R4.9 of type {6,12} Reflexible Genus 4 map R4.9* of type {12,6} Reflexible Group <24,12> Number of orientably-regular maps = 2 Genus 0 map R0.201 of type {3,4} Reflexible Genus 0 map R0.201* of type {4,3} Reflexible Group <24,13> Number of orientably-regular maps = 3 Genus 1 map R1.3 of type {3,6} Reflexible Genus 1 map R1.3* of type {6,3} Reflexible Genus 3 map R3.8 of type {6,6} Reflexible Self-dual ............................................................................... Groups of order 26 Total = 2 Group <26,1> Number of orientably-regular maps = 2 Genus 0 map R0.12 of type {2,13} Reflexible Genus 0 map R0.12* of type {13,2} Reflexible Group <26,2> Number of orientably-regular maps = 2 Genus 6 map R6.11 of type {13,26} Reflexible Genus 6 map R6.11* of type {26,13} Reflexible ............................................................................... Groups of order 28 Total = 4 Group <28,2> Number of orientably-regular maps = 1 Genus 7 map R7.12 of type {28,28} Reflexible Self-dual Group <28,3> Number of orientably-regular maps = 2 Genus 0 map R0.13 of type {2,14} Reflexible Genus 0 map R0.13* of type {14,2} Reflexible Group <28,4> Number of orientably-regular maps = 1 Genus 6 map R6.12 of type {14,14} Reflexible Self-dual ............................................................................... Groups of order 30 Total = 4 Group <30,1> Number of orientably-regular maps = 2 Genus 6 map R6.10 of type {10,15} Reflexible Genus 6 map R6.10* of type {15,10} Reflexible Group <30,2> Number of orientably-regular maps = 2 Genus 5 map R5.11 of type {6,15} Reflexible Genus 5 map R5.11* of type {15,6} Reflexible Group <30,3> Number of orientably-regular maps = 2 Genus 0 map R0.14 of type {2,15} Reflexible Genus 0 map R0.14* of type {15,2} Reflexible Group <30,4> Number of orientably-regular maps = 2 Genus 7 map R7.9 of type {15,30} Reflexible Genus 7 map R7.9* of type {30,15} Reflexible ............................................................................... Groups of order 32 Total = 51 Group <32,1> Number of orientably-regular maps = 1 Genus 8 map R8.11 of type {32,32} Reflexible Self-dual Group <32,5> Number of orientably-regular maps = 1 Genus 5 map R5.13 of type {8,8} Reflexible Self-dual Group <32,6> Number of orientably-regular maps = 1 Genus 1 map R1.16 of type {4,4} Reflexible Self-dual Group <32,7> Number of orientably-regular maps = 1 Genus 5 map R5.12 of type {8,8} Reflexible Self-dual Group <32,9> Number of orientably-regular maps = 2 Genus 3 map R3.6 of type {4,8} Reflexible Genus 3 map R3.6* of type {8,4} Reflexible Group <32,11> Number of orientably-regular maps = 2 Genus 3 map R3.5 of type {4,8} Reflexible Genus 3 map R3.5* of type {8,4} Reflexible Group <32,16> Number of orientably-regular maps = 1 Genus 7 map R7.10 of type {16,16} Reflexible Self-dual Group <32,17> Number of orientably-regular maps = 1 Genus 7 map R7.11 of type {16,16} Reflexible Self-dual Group <32,18> Number of orientably-regular maps = 2 Genus 0 map R0.15 of type {2,16} Reflexible Genus 0 map R0.15* of type {16,2} Reflexible Group <32,19> Number of orientably-regular maps = 2 Genus 4 map R4.5 of type {4,16} Reflexible Genus 4 map R4.5* of type {16,4} Reflexible ............................................................................... Groups of order 34 Total = 2 Group <34,1> Number of orientably-regular maps = 2 Genus 0 map R0.16 of type {2,17} Reflexible Genus 0 map R0.16* of type {17,2} Reflexible Group <34,2> Number of orientably-regular maps = 2 Genus 8 map R8.9 of type {17,34} Reflexible Genus 8 map R8.9* of type {34,17} Reflexible ............................................................................... Groups of order 36 Total = 14 Group <36,2> Number of orientably-regular maps = 1 Genus 9 map R9.32 of type {36,36} Reflexible Self-dual Group <36,3> Number of orientably-regular maps = 1 Genus 6 map R6.9 of type {9,9} Reflexible Self-dual Group <36,4> Number of orientably-regular maps = 2 Genus 0 map R0.17 of type {2,18} Reflexible Genus 0 map R0.17* of type {18,2} Reflexible Group <36,5> Number of orientably-regular maps = 1 Genus 8 map R8.10 of type {18,18} Reflexible Self-dual Group <36,9> Number of orientably-regular maps = 1 Genus 1 map R1.17 of type {4,4} Reflexible Self-dual Group <36,10> Number of orientably-regular maps = 1 Genus 4 map R4.7 of type {6,6} Reflexible Self-dual Group <36,12> Number of orientably-regular maps = 2 Genus 4 map R4.8 of type {6,6} Reflexible Non-self-dual Genus 4 map R4.8* of type {6,6} Reflexible Non-self-dual ............................................................................... Groups of order 38 Total = 2 Group <38,1> Number of orientably-regular maps = 2 Genus 0 map R0.18 of type {2,19} Reflexible Genus 0 map R0.18* of type {19,2} Reflexible Group <38,2> Number of orientably-regular maps = 2 Genus 9 map R9.30 of type {19,38} Reflexible Genus 9 map R9.30* of type {38,19} Reflexible ............................................................................... Groups of order 40 Total = 14 Group <40,2> Number of orientably-regular maps = 1 Genus 10 map R10.24 of type {40,40} Reflexible Self-dual Group <40,5> Number of orientably-regular maps = 2 Genus 5 map R5.8 of type {4,20} Reflexible Genus 5 map R5.8* of type {20,4} Reflexible Group <40,6> Number of orientably-regular maps = 2 Genus 0 map R0.19 of type {2,20} Reflexible Genus 0 map R0.19* of type {20,2} Reflexible Group <40,8> Number of orientably-regular maps = 2 Genus 4 map R4.4 of type {4,10} Reflexible Genus 4 map R4.4* of type {10,4} Reflexible Group <40,9> Number of orientably-regular maps = 1 Genus 9 map R9.31 of type {20,20} Reflexible Self-dual Group <40,10> Number of orientably-regular maps = 2 Genus 8 map R8.8 of type {10,20} Reflexible Genus 8 map R8.8* of type {20,10} Reflexible Group <40,12> Number of orientably-regular maps = 2 Genus 1 map C1.16 of type {4,4} Chiral Self-dual Genus 1 map C1.16# of type {4,4} Chiral Self-dual ............................................................................... Groups of order 42 Total = 6 Group <42,1> Number of orientably-regular maps = 4 Genus 1 map C1.1 of type {3,6} Chiral Genus 1 map C1.1# of type {3,6} Chiral Genus 1 map C1.1* of type {6,3} Chiral Genus 1 map C1.1*# of type {6,3} Chiral Group <42,3> Number of orientably-regular maps = 2 Genus 9 map R9.29 of type {14,21} Reflexible Genus 9 map R9.29* of type {21,14} Reflexible Group <42,4> Number of orientably-regular maps = 2 Genus 7 map R7.8 of type {6,21} Reflexible Genus 7 map R7.8* of type {21,6} Reflexible Group <42,5> Number of orientably-regular maps = 2 Genus 0 map R0.20 of type {2,21} Reflexible Genus 0 map R0.20* of type {21,2} Reflexible Group <42,6> Number of orientably-regular maps = 2 Genus 10 map R10.22 of type {21,42} Reflexible Genus 10 map R10.22* of type {42,21} Reflexible ............................................................................... Groups of order 44 Total = 4 Group <44,2> Number of orientably-regular maps = 1 Genus 11 map R11.14 of type {44,44} Reflexible Self-dual Group <44,3> Number of orientably-regular maps = 2 Genus 0 map R0.21 of type {2,22} Reflexible Genus 0 map R0.21* of type {22,2} Reflexible Group <44,4> Number of orientably-regular maps = 1 Genus 10 map R10.23 of type {22,22} Reflexible Self-dual ............................................................................... Groups of order 46 Total = 2 Group <46,1> Number of orientably-regular maps = 2 Genus 0 map R0.22 of type {2,23} Reflexible Genus 0 map R0.22* of type {23,2} Reflexible Group <46,2> Number of orientably-regular maps = 2 Genus 11 map R11.11 of type {23,46} Reflexible Genus 11 map R11.11* of type {46,23} Reflexible ............................................................................... Groups of order 48 Total = 52 Group <48,2> Number of orientably-regular maps = 1 Genus 12 map R12.11 of type {48,48} Reflexible Self-dual Group <48,4> Number of orientably-regular maps = 2 Genus 9 map R9.25 of type {8,24} Reflexible Genus 9 map R9.25* of type {24,8} Reflexible Group <48,5> Number of orientably-regular maps = 2 Genus 9 map R9.24 of type {8,24} Reflexible Genus 9 map R9.24* of type {24,8} Reflexible Group <48,6> Number of orientably-regular maps = 2 Genus 6 map R6.5 of type {4,24} Reflexible Genus 6 map R6.5* of type {24,4} Reflexible Group <48,7> Number of orientably-regular maps = 2 Genus 0 map R0.23 of type {2,24} Reflexible Genus 0 map R0.23* of type {24,2} Reflexible Group <48,14> Number of orientably-regular maps = 2 Genus 5 map R5.7 of type {4,12} Reflexible Genus 5 map R5.7* of type {12,4} Reflexible Group <48,15> Number of orientably-regular maps = 2 Genus 6 map R6.7 of type {6,8} Reflexible Genus 6 map R6.7* of type {8,6} Reflexible Group <48,17> Number of orientably-regular maps = 2 Genus 8 map R8.7 of type {8,12} Reflexible Genus 8 map R8.7* of type {12,8} Reflexible Group <48,21> Number of orientably-regular maps = 1 Genus 9 map R9.28 of type {12,12} Reflexible Self-dual Group <48,23> Number of orientably-regular maps = 1 Genus 11 map R11.12 of type {24,24} Reflexible Self-dual Group <48,24> Number of orientably-regular maps = 1 Genus 11 map R11.13 of type {24,24} Reflexible Self-dual Group <48,25> Number of orientably-regular maps = 2 Genus 8 map R8.6 of type {6,24} Reflexible Genus 8 map R8.6* of type {24,6} Reflexible Group <48,26> Number of orientably-regular maps = 2 Genus 10 map R10.21 of type {12,24} Reflexible Genus 10 map R10.21* of type {24,12} Reflexible Group <48,29> Number of orientably-regular maps = 4 Genus 2 map R2.1 of type {3,8} Reflexible Genus 2 map R2.1* of type {8,3} Reflexible Genus 6 map R6.8 of type {6,8} Reflexible Genus 6 map R6.8* of type {8,6} Reflexible Group <48,31> Number of orientably-regular maps = 2 Genus 9 map R9.26 of type {12,12} Reflexible Self-dual Genus 9 map R9.27 of type {12,12} Reflexible Self-dual Group <48,33> Number of orientably-regular maps = 4 Genus 3 map R3.3 of type {3,12} Reflexible Genus 3 map R3.3* of type {12,3} Reflexible Genus 7 map R7.7 of type {6,12} Reflexible Genus 7 map R7.7* of type {12,6} Reflexible Group <48,48> Number of orientably-regular maps = 2 Genus 3 map R3.4 of type {4,6} Reflexible Genus 3 map R3.4* of type {6,4} Reflexible Group <48,49> Number of orientably-regular maps = 1 Genus 5 map R5.10 of type {6,6} Reflexible Self-dual ............................................................................... Groups of order 50 Total = 5 Group <50,1> Number of orientably-regular maps = 2 Genus 0 map R0.24 of type {2,25} Reflexible Genus 0 map R0.24* of type {25,2} Reflexible Group <50,2> Number of orientably-regular maps = 2 Genus 12 map R12.9 of type {25,50} Reflexible Genus 12 map R12.9* of type {50,25} Reflexible Group <50,3> Number of orientably-regular maps = 2 Genus 6 map R6.6 of type {5,10} Reflexible Genus 6 map R6.6* of type {10,5} Reflexible ............................................................................... Groups of order 52 Total = 5 Group <52,2> Number of orientably-regular maps = 1 Genus 13 map R13.22 of type {52,52} Reflexible Self-dual Group <52,3> Number of orientably-regular maps = 2 Genus 1 map C1.17 of type {4,4} Chiral Self-dual Genus 1 map C1.17# of type {4,4} Chiral Self-dual Group <52,4> Number of orientably-regular maps = 2 Genus 0 map R0.25 of type {2,26} Reflexible Genus 0 map R0.25* of type {26,2} Reflexible Group <52,5> Number of orientably-regular maps = 1 Genus 12 map R12.10 of type {26,26} Reflexible Self-dual ............................................................................... Groups of order 54 Total = 15 Group <54,1> Number of orientably-regular maps = 2 Genus 0 map R0.26 of type {2,27} Reflexible Genus 0 map R0.26* of type {27,2} Reflexible Group <54,2> Number of orientably-regular maps = 2 Genus 13 map R13.20 of type {27,54} Reflexible Genus 13 map R13.20* of type {54,27} Reflexible Group <54,3> Number of orientably-regular maps = 2 Genus 7 map R7.6 of type {6,9} Reflexible Genus 7 map R7.6* of type {9,6} Reflexible Group <54,4> Number of orientably-regular maps = 2 Genus 10 map R10.20 of type {9,18} Reflexible Genus 10 map R10.20* of type {18,9} Reflexible Group <54,5> Number of orientably-regular maps = 2 Genus 1 map R1.4 of type {3,6} Reflexible Genus 1 map R1.4* of type {6,3} Reflexible Group <54,6> Number of orientably-regular maps = 4 Genus 7 map C7.1 of type {6,9} Chiral Genus 7 map C7.1# of type {6,9} Chiral Genus 7 map C7.1* of type {9,6} Chiral Genus 7 map C7.1*# of type {9,6} Chiral ............................................................................... Groups of order 56 Total = 13 Group <56,2> Number of orientably-regular maps = 1 Genus 14 map R14.12 of type {56,56} Reflexible Self-dual Group <56,4> Number of orientably-regular maps = 2 Genus 7 map R7.5 of type {4,28} Reflexible Genus 7 map R7.5* of type {28,4} Reflexible Group <56,5> Number of orientably-regular maps = 2 Genus 0 map R0.27 of type {2,28} Reflexible Genus 0 map R0.27* of type {28,2} Reflexible Group <56,7> Number of orientably-regular maps = 2 Genus 6 map R6.4 of type {4,14} Reflexible Genus 6 map R6.4* of type {14,4} Reflexible Group <56,8> Number of orientably-regular maps = 1 Genus 13 map R13.21 of type {28,28} Reflexible Self-dual Group <56,9> Number of orientably-regular maps = 2 Genus 12 map R12.7 of type {14,28} Reflexible Genus 12 map R12.7* of type {28,14} Reflexible Group <56,11> Number of orientably-regular maps = 2 Genus 7 map C7.2 of type {7,7} Chiral Mirror-self-dual Genus 7 map C7.2# of type {7,7} Chiral Mirror-self-dual ............................................................................... Groups of order 58 Total = 2 Group <58,1> Number of orientably-regular maps = 2 Genus 0 map R0.28 of type {2,29} Reflexible Genus 0 map R0.28* of type {29,2} Reflexible Group <58,2> Number of orientably-regular maps = 2 Genus 14 map R14.10 of type {29,58} Reflexible Genus 14 map R14.10* of type {58,29} Reflexible ............................................................................... Groups of order 60 Total = 13 Group <60,4> Number of orientably-regular maps = 1 Genus 15 map R15.23 of type {60,60} Reflexible Self-dual Group <60,5> Number of orientably-regular maps = 3 Genus 0 map R0.202 of type {3,5} Reflexible Genus 0 map R0.202* of type {5,3} Reflexible Genus 4 map R4.6 of type {5,5} Reflexible Self-dual Group <60,6> Number of orientably-regular maps = 2 Genus 11 map C11.6 of type {12,12} Chiral Self-dual Genus 11 map C11.6# of type {12,12} Chiral Self-dual Group <60,8> Number of orientably-regular maps = 2 Genus 8 map R8.5 of type {6,10} Reflexible Genus 8 map R8.5* of type {10,6} Reflexible Group <60,9> Number of orientably-regular maps = 1 Genus 12 map R12.8 of type {15,15} Reflexible Self-dual Group <60,10> Number of orientably-regular maps = 2 Genus 10 map R10.19 of type {6,30} Reflexible Genus 10 map R10.19* of type {30,6} Reflexible Group <60,11> Number of orientably-regular maps = 2 Genus 12 map R12.6 of type {10,30} Reflexible Genus 12 map R12.6* of type {30,10} Reflexible Group <60,12> Number of orientably-regular maps = 2 Genus 0 map R0.29 of type {2,30} Reflexible Genus 0 map R0.29* of type {30,2} Reflexible Group <60,13> Number of orientably-regular maps = 1 Genus 14 map R14.11 of type {30,30} Reflexible Self-dual ............................................................................... Groups of order 62 Total = 2 Group <62,1> Number of orientably-regular maps = 2 Genus 0 map R0.30 of type {2,31} Reflexible Genus 0 map R0.30* of type {31,2} Reflexible Group <62,2> Number of orientably-regular maps = 2 Genus 15 map R15.20 of type {31,62} Reflexible Genus 15 map R15.20* of type {62,31} Reflexible ............................................................................... Groups of order 64 Total = 267 Group <64,1> Number of orientably-regular maps = 1 Genus 16 map R16.17 of type {64,64} Reflexible Self-dual Group <64,4> Number of orientably-regular maps = 1 Genus 9 map R9.22 of type {8,8} Reflexible Self-dual Group <64,6> Number of orientably-regular maps = 2 Genus 9 map R9.20 of type {8,8} Reflexible Non-self-dual Genus 9 map R9.20* of type {8,8} Reflexible Non-self-dual Group <64,8> Number of orientably-regular maps = 2 Genus 5 map R5.6 of type {4,8} Reflexible Genus 5 map R5.6* of type {8,4} Reflexible Group <64,10> Number of orientably-regular maps = 1 Genus 9 map R9.21 of type {8,8} Reflexible Self-dual Group <64,12> Number of orientably-regular maps = 1 Genus 9 map R9.19 of type {8,8} Reflexible Self-dual Group <64,29> Number of orientably-regular maps = 1 Genus 13 map R13.19 of type {16,16} Reflexible Self-dual Group <64,30> Number of orientably-regular maps = 1 Genus 13 map R13.18 of type {16,16} Reflexible Self-dual Group <64,31> Number of orientably-regular maps = 2 Genus 13 map R13.17 of type {16,16} Reflexible Non-self-dual Genus 13 map R13.17* of type {16,16} Reflexible Non-self-dual Group <64,32> Number of orientably-regular maps = 2 Genus 5 map R5.5 of type {4,8} Reflexible Genus 5 map R5.5* of type {8,4} Reflexible Group <64,34> Number of orientably-regular maps = 1 Genus 1 map R1.18 of type {4,4} Reflexible Self-dual Group <64,36> Number of orientably-regular maps = 1 Genus 9 map R9.23 of type {8,8} Reflexible Self-dual Group <64,38> Number of orientably-regular maps = 2 Genus 7 map R7.4 of type {4,16} Reflexible Genus 7 map R7.4* of type {16,4} Reflexible Group <64,40> Number of orientably-regular maps = 2 Genus 11 map R11.10 of type {8,16} Reflexible Genus 11 map R11.10* of type {16,8} Reflexible Group <64,41> Number of orientably-regular maps = 2 Genus 7 map R7.3 of type {4,16} Reflexible Genus 7 map R7.3* of type {16,4} Reflexible Group <64,42> Number of orientably-regular maps = 2 Genus 11 map R11.9 of type {8,16} Reflexible Genus 11 map R11.9* of type {16,8} Reflexible Group <64,50> Number of orientably-regular maps = 1 Genus 15 map R15.21 of type {32,32} Reflexible Self-dual Group <64,51> Number of orientably-regular maps = 1 Genus 15 map R15.22 of type {32,32} Reflexible Self-dual Group <64,52> Number of orientably-regular maps = 2 Genus 0 map R0.31 of type {2,32} Reflexible Genus 0 map R0.31* of type {32,2} Reflexible Group <64,53> Number of orientably-regular maps = 2 Genus 8 map R8.4 of type {4,32} Reflexible Genus 8 map R8.4* of type {32,4} Reflexible ............................................................................... Groups of order 66 Total = 4 Group <66,1> Number of orientably-regular maps = 2 Genus 15 map R15.19 of type {22,33} Reflexible Genus 15 map R15.19* of type {33,22} Reflexible Group <66,2> Number of orientably-regular maps = 2 Genus 11 map R11.8 of type {6,33} Reflexible Genus 11 map R11.8* of type {33,6} Reflexible Group <66,3> Number of orientably-regular maps = 2 Genus 0 map R0.32 of type {2,33} Reflexible Genus 0 map R0.32* of type {33,2} Reflexible Group <66,4> Number of orientably-regular maps = 2 Genus 16 map R16.15 of type {33,66} Reflexible Genus 16 map R16.15* of type {66,33} Reflexible ............................................................................... Groups of order 68 Total = 5 Group <68,2> Number of orientably-regular maps = 1 Genus 17 map R17.40 of type {68,68} Reflexible Self-dual Group <68,3> Number of orientably-regular maps = 2 Genus 1 map C1.18 of type {4,4} Chiral Self-dual Genus 1 map C1.18# of type {4,4} Chiral Self-dual Group <68,4> Number of orientably-regular maps = 2 Genus 0 map R0.33 of type {2,34} Reflexible Genus 0 map R0.33* of type {34,2} Reflexible Group <68,5> Number of orientably-regular maps = 1 Genus 16 map R16.16 of type {34,34} Reflexible Self-dual ............................................................................... Groups of order 70 Total = 4 Group <70,1> Number of orientably-regular maps = 2 Genus 15 map R15.17 of type {14,35} Reflexible Genus 15 map R15.17* of type {35,14} Reflexible Group <70,2> Number of orientably-regular maps = 2 Genus 14 map R14.9 of type {10,35} Reflexible Genus 14 map R14.9* of type {35,10} Reflexible Group <70,3> Number of orientably-regular maps = 2 Genus 0 map R0.34 of type {2,35} Reflexible Genus 0 map R0.34* of type {35,2} Reflexible Group <70,4> Number of orientably-regular maps = 2 Genus 17 map R17.38 of type {35,70} Reflexible Genus 17 map R17.38* of type {70,35} Reflexible ............................................................................... Groups of order 72 Total = 50 Group <72,2> Number of orientably-regular maps = 1 Genus 18 map R18.14 of type {72,72} Reflexible Self-dual Group <72,5> Number of orientably-regular maps = 2 Genus 9 map R9.13 of type {4,36} Reflexible Genus 9 map R9.13* of type {36,4} Reflexible Group <72,6> Number of orientably-regular maps = 2 Genus 0 map R0.35 of type {2,36} Reflexible Genus 0 map R0.35* of type {36,2} Reflexible Group <72,8> Number of orientably-regular maps = 2 Genus 8 map R8.3 of type {4,18} Reflexible Genus 8 map R8.3* of type {18,4} Reflexible Group <72,9> Number of orientably-regular maps = 1 Genus 17 map R17.39 of type {36,36} Reflexible Self-dual Group <72,10> Number of orientably-regular maps = 2 Genus 16 map R16.14 of type {18,36} Reflexible Genus 16 map R16.14* of type {36,18} Reflexible Group <72,15> Number of orientably-regular maps = 2 Genus 6 map R6.3 of type {4,9} Reflexible Genus 6 map R6.3* of type {9,4} Reflexible Group <72,16> Number of orientably-regular maps = 3 Genus 13 map R13.14 of type {9,18} Reflexible Genus 13 map R13.14* of type {18,9} Reflexible Genus 15 map R15.18 of type {18,18} Reflexible Self-dual Group <72,21> Number of orientably-regular maps = 1 Genus 13 map R13.15 of type {12,12} Reflexible Self-dual Group <72,23> Number of orientably-regular maps = 2 Genus 10 map R10.17 of type {6,12} Reflexible Genus 10 map R10.17* of type {12,6} Reflexible Group <72,27> Number of orientably-regular maps = 2 Genus 13 map R13.16 of type {12,12} Reflexible Non-self-dual Genus 13 map R13.16* of type {12,12} Reflexible Non-self-dual Group <72,28> Number of orientably-regular maps = 2 Genus 10 map R10.18 of type {6,12} Reflexible Genus 10 map R10.18* of type {12,6} Reflexible Group <72,30> Number of orientably-regular maps = 2 Genus 10 map R10.16 of type {6,12} Reflexible Genus 10 map R10.16* of type {12,6} Reflexible Group <72,39> Number of orientably-regular maps = 2 Genus 10 map C10.3 of type {8,8} Chiral Self-dual Genus 10 map C10.3# of type {8,8} Chiral Self-dual Group <72,40> Number of orientably-regular maps = 2 Genus 4 map R4.3 of type {4,6} Reflexible Genus 4 map R4.3* of type {6,4} Reflexible Group <72,42> Number of orientably-regular maps = 2 Genus 4 map R4.1 of type {3,12} Reflexible Genus 4 map R4.1* of type {12,3} Reflexible Group <72,44> Number of orientably-regular maps = 2 Genus 1 map R1.5 of type {3,6} Reflexible Genus 1 map R1.5* of type {6,3} Reflexible Group <72,45> Number of orientably-regular maps = 1 Genus 1 map R1.19 of type {4,4} Reflexible Self-dual ............................................................................... Groups of order 74 Total = 2 Group <74,1> Number of orientably-regular maps = 2 Genus 0 map R0.36 of type {2,37} Reflexible Genus 0 map R0.36* of type {37,2} Reflexible Group <74,2> Number of orientably-regular maps = 2 Genus 18 map R18.12 of type {37,74} Reflexible Genus 18 map R18.12* of type {74,37} Reflexible ............................................................................... Groups of order 76 Total = 4 Group <76,2> Number of orientably-regular maps = 1 Genus 19 map R19.35 of type {76,76} Reflexible Self-dual Group <76,3> Number of orientably-regular maps = 2 Genus 0 map R0.37 of type {2,38} Reflexible Genus 0 map R0.37* of type {38,2} Reflexible Group <76,4> Number of orientably-regular maps = 1 Genus 18 map R18.13 of type {38,38} Reflexible Self-dual ............................................................................... Groups of order 78 Total = 6 Group <78,1> Number of orientably-regular maps = 4 Genus 1 map C1.2 of type {3,6} Chiral Genus 1 map C1.2# of type {3,6} Chiral Genus 1 map C1.2* of type {6,3} Chiral Genus 1 map C1.2*# of type {6,3} Chiral Group <78,3> Number of orientably-regular maps = 2 Genus 18 map R18.11 of type {26,39} Reflexible Genus 18 map R18.11* of type {39,26} Reflexible Group <78,4> Number of orientably-regular maps = 2 Genus 13 map R13.13 of type {6,39} Reflexible Genus 13 map R13.13* of type {39,6} Reflexible Group <78,5> Number of orientably-regular maps = 2 Genus 0 map R0.38 of type {2,39} Reflexible Genus 0 map R0.38* of type {39,2} Reflexible Group <78,6> Number of orientably-regular maps = 2 Genus 19 map R19.32 of type {39,78} Reflexible Genus 19 map R19.32* of type {78,39} Reflexible ............................................................................... Groups of order 80 Total = 52 Group <80,2> Number of orientably-regular maps = 1 Genus 20 map R20.13 of type {80,80} Reflexible Self-dual Group <80,4> Number of orientably-regular maps = 2 Genus 15 map R15.16 of type {8,40} Reflexible Genus 15 map R15.16* of type {40,8} Reflexible Group <80,5> Number of orientably-regular maps = 2 Genus 15 map R15.15 of type {8,40} Reflexible Genus 15 map R15.15* of type {40,8} Reflexible Group <80,6> Number of orientably-regular maps = 2 Genus 10 map R10.12 of type {4,40} Reflexible Genus 10 map R10.12* of type {40,4} Reflexible Group <80,7> Number of orientably-regular maps = 2 Genus 0 map R0.39 of type {2,40} Reflexible Genus 0 map R0.39* of type {40,2} Reflexible Group <80,14> Number of orientably-regular maps = 2 Genus 9 map R9.12 of type {4,20} Reflexible Genus 9 map R9.12* of type {20,4} Reflexible Group <80,15> Number of orientably-regular maps = 2 Genus 12 map R12.5 of type {8,10} Reflexible Genus 12 map R12.5* of type {10,8} Reflexible Group <80,17> Number of orientably-regular maps = 2 Genus 14 map R14.8 of type {8,20} Reflexible Genus 14 map R14.8* of type {20,8} Reflexible Group <80,21> Number of orientably-regular maps = 1 Genus 17 map R17.37 of type {20,20} Reflexible Self-dual Group <80,23> Number of orientably-regular maps = 1 Genus 19 map R19.34 of type {40,40} Reflexible Self-dual Group <80,24> Number of orientably-regular maps = 1 Genus 19 map R19.33 of type {40,40} Reflexible Self-dual Group <80,25> Number of orientably-regular maps = 2 Genus 16 map R16.13 of type {10,40} Reflexible Genus 16 map R16.13* of type {40,10} Reflexible Group <80,26> Number of orientably-regular maps = 2 Genus 18 map R18.9 of type {20,40} Reflexible Genus 18 map R18.9* of type {40,20} Reflexible Group <80,28> Number of orientably-regular maps = 2 Genus 11 map C11.5 of type {8,8} Chiral Self-dual Genus 11 map C11.5# of type {8,8} Chiral Self-dual Group <80,29> Number of orientably-regular maps = 2 Genus 11 map C11.4 of type {8,8} Chiral Self-dual Genus 11 map C11.4# of type {8,8} Chiral Self-dual Group <80,34> Number of orientably-regular maps = 2 Genus 1 map C1.19 of type {4,4} Chiral Self-dual Genus 1 map C1.19# of type {4,4} Chiral Self-dual Group <80,49> Number of orientably-regular maps = 1 Genus 5 map R5.9 of type {5,5} Reflexible Self-dual ............................................................................... Groups of order 82 Total = 2 Group <82,1> Number of orientably-regular maps = 2 Genus 0 map R0.40 of type {2,41} Reflexible Genus 0 map R0.40* of type {41,2} Reflexible Group <82,2> Number of orientably-regular maps = 2 Genus 20 map R20.11 of type {41,82} Reflexible Genus 20 map R20.11* of type {82,41} Reflexible ............................................................................... Groups of order 84 Total = 15 Group <84,6> Number of orientably-regular maps = 1 Genus 21 map R21.40 of type {84,84} Reflexible Self-dual Group <84,7> Number of orientably-regular maps = 4 Genus 8 map C8.1 of type {6,6} Chiral Non-SD Non-MSD Genus 8 map C8.1# of type {6,6} Chiral Non-SD Non-MSD Genus 8 map C8.1* of type {6,6} Chiral Non-SD Non-MSD Genus 8 map C8.1*# of type {6,6} Chiral Non-SD Non-MSD Group <84,8> Number of orientably-regular maps = 2 Genus 12 map R12.4 of type {6,14} Reflexible Genus 12 map R12.4* of type {14,6} Reflexible Group <84,10> Number of orientably-regular maps = 1 Genus 18 map R18.10 of type {21,21} Reflexible Self-dual Group <84,12> Number of orientably-regular maps = 2 Genus 14 map R14.7 of type {6,42} Reflexible Genus 14 map R14.7* of type {42,6} Reflexible Group <84,13> Number of orientably-regular maps = 2 Genus 18 map R18.8 of type {14,42} Reflexible Genus 18 map R18.8* of type {42,14} Reflexible Group <84,14> Number of orientably-regular maps = 2 Genus 0 map R0.41 of type {2,42} Reflexible Genus 0 map R0.41* of type {42,2} Reflexible Group <84,15> Number of orientably-regular maps = 1 Genus 20 map R20.12 of type {42,42} Reflexible Self-dual ............................................................................... Groups of order 86 Total = 2 Group <86,1> Number of orientably-regular maps = 2 Genus 0 map R0.42 of type {2,43} Reflexible Genus 0 map R0.42* of type {43,2} Reflexible Group <86,2> Number of orientably-regular maps = 2 Genus 21 map R21.38 of type {43,86} Reflexible Genus 21 map R21.38* of type {86,43} Reflexible ............................................................................... Groups of order 88 Total = 12 Group <88,2> Number of orientably-regular maps = 1 Genus 22 map R22.18 of type {88,88} Reflexible Self-dual Group <88,4> Number of orientably-regular maps = 2 Genus 11 map R11.4 of type {4,44} Reflexible Genus 11 map R11.4* of type {44,4} Reflexible Group <88,5> Number of orientably-regular maps = 2 Genus 0 map R0.43 of type {2,44} Reflexible Genus 0 map R0.43* of type {44,2} Reflexible Group <88,7> Number of orientably-regular maps = 2 Genus 10 map R10.11 of type {4,22} Reflexible Genus 10 map R10.11* of type {22,4} Reflexible Group <88,8> Number of orientably-regular maps = 1 Genus 21 map R21.39 of type {44,44} Reflexible Self-dual Group <88,9> Number of orientably-regular maps = 2 Genus 20 map R20.10 of type {22,44} Reflexible Genus 20 map R20.10* of type {44,22} Reflexible ............................................................................... Groups of order 90 Total = 10 Group <90,1> Number of orientably-regular maps = 2 Genus 18 map R18.6 of type {10,45} Reflexible Genus 18 map R18.6* of type {45,10} Reflexible Group <90,2> Number of orientably-regular maps = 2 Genus 20 map R20.9 of type {18,45} Reflexible Genus 20 map R20.9* of type {45,18} Reflexible Group <90,3> Number of orientably-regular maps = 2 Genus 0 map R0.44 of type {2,45} Reflexible Genus 0 map R0.44* of type {45,2} Reflexible Group <90,4> Number of orientably-regular maps = 2 Genus 22 map R22.16 of type {45,90} Reflexible Genus 22 map R22.16* of type {90,45} Reflexible Group <90,6> Number of orientably-regular maps = 2 Genus 19 map R19.31 of type {15,30} Reflexible Genus 19 map R19.31* of type {30,15} Reflexible Group <90,7> Number of orientably-regular maps = 2 Genus 13 map R13.12 of type {6,15} Reflexible Genus 13 map R13.12* of type {15,6} Reflexible ............................................................................... Groups of order 92 Total = 4 Group <92,2> Number of orientably-regular maps = 1 Genus 23 map R23.11 of type {92,92} Reflexible Self-dual Group <92,3> Number of orientably-regular maps = 2 Genus 0 map R0.45 of type {2,46} Reflexible Genus 0 map R0.45* of type {46,2} Reflexible Group <92,4> Number of orientably-regular maps = 1 Genus 22 map R22.17 of type {46,46} Reflexible Self-dual ............................................................................... Groups of order 94 Total = 2 Group <94,1> Number of orientably-regular maps = 2 Genus 0 map R0.46 of type {2,47} Reflexible Genus 0 map R0.46* of type {47,2} Reflexible Group <94,2> Number of orientably-regular maps = 2 Genus 23 map R23.8 of type {47,94} Reflexible Genus 23 map R23.8* of type {94,47} Reflexible ............................................................................... Groups of order 96 Total = 231 Group <96,2> Number of orientably-regular maps = 1 Genus 24 map R24.17 of type {96,96} Reflexible Self-dual Group <96,4> Number of orientably-regular maps = 2 Genus 21 map R21.31 of type {16,48} Reflexible Genus 21 map R21.31* of type {48,16} Reflexible Group <96,5> Number of orientably-regular maps = 2 Genus 21 map R21.30 of type {16,48} Reflexible Genus 21 map R21.30* of type {48,16} Reflexible Group <96,6> Number of orientably-regular maps = 2 Genus 0 map R0.47 of type {2,48} Reflexible Genus 0 map R0.47* of type {48,2} Reflexible Group <96,7> Number of orientably-regular maps = 2 Genus 12 map R12.3 of type {4,48} Reflexible Genus 12 map R12.3* of type {48,4} Reflexible Group <96,12> Number of orientably-regular maps = 2 Genus 15 map R15.14 of type {8,12} Reflexible Genus 15 map R15.14* of type {12,8} Reflexible Group <96,13> Number of orientably-regular maps = 2 Genus 9 map R9.10 of type {4,12} Reflexible Genus 9 map R9.10* of type {12,4} Reflexible Group <96,16> Number of orientably-regular maps = 2 Genus 15 map R15.13 of type {8,12} Reflexible Genus 15 map R15.13* of type {12,8} Reflexible Group <96,27> Number of orientably-regular maps = 2 Genus 17 map R17.33 of type {8,24} Reflexible Genus 17 map R17.33* of type {24,8} Reflexible Group <96,28> Number of orientably-regular maps = 2 Genus 11 map R11.3 of type {4,24} Reflexible Genus 11 map R11.3* of type {24,4} Reflexible Group <96,30> Number of orientably-regular maps = 2 Genus 17 map R17.32 of type {8,24} Reflexible Genus 17 map R17.32* of type {24,8} Reflexible Group <96,32> Number of orientably-regular maps = 2 Genus 11 map R11.2 of type {4,24} Reflexible Genus 11 map R11.2* of type {24,4} Reflexible Group <96,33> Number of orientably-regular maps = 2 Genus 14 map R14.6 of type {6,16} Reflexible Genus 14 map R14.6* of type {16,6} Reflexible Group <96,35> Number of orientably-regular maps = 2 Genus 18 map R18.7 of type {12,16} Reflexible Genus 18 map R18.7* of type {16,12} Reflexible Group <96,48> Number of orientably-regular maps = 1 Genus 21 map R21.36 of type {24,24} Reflexible Self-dual Group <96,49> Number of orientably-regular maps = 1 Genus 17 map R17.36 of type {12,12} Reflexible Self-dual Group <96,50> Number of orientably-regular maps = 1 Genus 21 map R21.37 of type {24,24} Reflexible Self-dual Group <96,52> Number of orientably-regular maps = 2 Genus 19 map R19.29 of type {12,24} Reflexible Genus 19 map R19.29* of type {24,12} Reflexible Group <96,54> Number of orientably-regular maps = 2 Genus 19 map R19.30 of type {12,24} Reflexible Genus 19 map R19.30* of type {24,12} Reflexible Group <96,59> Number of orientably-regular maps = 1 Genus 23 map R23.10 of type {48,48} Reflexible Self-dual Group <96,60> Number of orientably-regular maps = 1 Genus 23 map R23.9 of type {48,48} Reflexible Self-dual Group <96,61> Number of orientably-regular maps = 2 Genus 16 map R16.10 of type {6,48} Reflexible Genus 16 map R16.10* of type {48,6} Reflexible Group <96,62> Number of orientably-regular maps = 2 Genus 20 map R20.8 of type {12,48} Reflexible Genus 20 map R20.8* of type {48,12} Reflexible Group <96,64> Number of orientably-regular maps = 2 Genus 3 map R3.2 of type {3,8} Reflexible Genus 3 map R3.2* of type {8,3} Reflexible Group <96,70> Number of orientably-regular maps = 1 Genus 9 map R9.18 of type {6,6} Reflexible Self-dual Group <96,72> Number of orientably-regular maps = 2 Genus 1 map R1.6 of type {3,6} Reflexible Genus 1 map R1.6* of type {6,3} Reflexible Group <96,73> Number of orientably-regular maps = 2 Genus 21 map R21.34 of type {24,24} Reflexible Self-dual Genus 21 map R21.35 of type {24,24} Reflexible Self-dual Group <96,74> Number of orientably-regular maps = 2 Genus 21 map R21.32 of type {24,24} Reflexible Self-dual Genus 21 map R21.33 of type {24,24} Reflexible Self-dual Group <96,186> Number of orientably-regular maps = 2 Genus 9 map R9.9 of type {4,12} Reflexible Genus 9 map R9.9* of type {12,4} Reflexible Group <96,187> Number of orientably-regular maps = 2 Genus 9 map R9.11 of type {4,12} Reflexible Genus 9 map R9.11* of type {12,4} Reflexible Group <96,189> Number of orientably-regular maps = 2 Genus 11 map R11.6 of type {6,8} Reflexible Genus 11 map R11.6* of type {8,6} Reflexible Group <96,190> Number of orientably-regular maps = 2 Genus 11 map R11.7 of type {6,8} Reflexible Genus 11 map R11.7* of type {8,6} Reflexible Group <96,192> Number of orientably-regular maps = 2 Genus 15 map R15.11 of type {8,12} Reflexible Genus 15 map R15.11* of type {12,8} Reflexible Group <96,193> Number of orientably-regular maps = 2 Genus 15 map R15.12 of type {8,12} Reflexible Genus 15 map R15.12* of type {12,8} Reflexible Group <96,195> Number of orientably-regular maps = 2 Genus 5 map R5.4 of type {4,6} Reflexible Genus 5 map R5.4* of type {6,4} Reflexible Group <96,196> Number of orientably-regular maps = 1 Genus 17 map R17.34 of type {12,12} Reflexible Self-dual Group <96,197> Number of orientably-regular maps = 2 Genus 13 map R13.10 of type {6,12} Reflexible Genus 13 map R13.10* of type {12,6} Reflexible Group <96,200> Number of orientably-regular maps = 2 Genus 13 map R13.11 of type {6,12} Reflexible Genus 13 map R13.11* of type {12,6} Reflexible Group <96,201> Number of orientably-regular maps = 1 Genus 17 map R17.35 of type {12,12} Reflexible Self-dual Group <96,202> Number of orientably-regular maps = 1 Genus 9 map R9.17 of type {6,6} Reflexible Self-dual ............................................................................... Groups of order 98 Total = 5 Group <98,1> Number of orientably-regular maps = 2 Genus 0 map R0.48 of type {2,49} Reflexible Genus 0 map R0.48* of type {49,2} Reflexible Group <98,2> Number of orientably-regular maps = 2 Genus 24 map R24.15 of type {49,98} Reflexible Genus 24 map R24.15* of type {98,49} Reflexible Group <98,3> Number of orientably-regular maps = 2 Genus 15 map R15.10 of type {7,14} Reflexible Genus 15 map R15.10* of type {14,7} Reflexible ............................................................................... Groups of order 100 Total = 16 Group <100,2> Number of orientably-regular maps = 1 Genus 25 map R25.44 of type {100,100} Reflexible Self-dual Group <100,3> Number of orientably-regular maps = 2 Genus 1 map C1.20 of type {4,4} Chiral Self-dual Genus 1 map C1.20# of type {4,4} Chiral Self-dual Group <100,4> Number of orientably-regular maps = 2 Genus 0 map R0.49 of type {2,50} Reflexible Genus 0 map R0.49* of type {50,2} Reflexible Group <100,5> Number of orientably-regular maps = 1 Genus 24 map R24.16 of type {50,50} Reflexible Self-dual Group <100,9> Number of orientably-regular maps = 2 Genus 21 map C21.10 of type {20,20} Chiral Self-dual Genus 21 map C21.10# of type {20,20} Chiral Self-dual Group <100,12> Number of orientably-regular maps = 1 Genus 1 map R1.20 of type {4,4} Reflexible Self-dual Group <100,13> Number of orientably-regular maps = 1 Genus 16 map R16.12 of type {10,10} Reflexible Self-dual Group <100,14> Number of orientably-regular maps = 2 Genus 16 map R16.11 of type {10,10} Reflexible Non-self-dual Genus 16 map R16.11* of type {10,10} Reflexible Non-self-dual ............................................................................... Groups of order 102 Total = 4 Group <102,1> Number of orientably-regular maps = 2 Genus 24 map R24.14 of type {34,51} Reflexible Genus 24 map R24.14* of type {51,34} Reflexible Group <102,2> Number of orientably-regular maps = 2 Genus 17 map R17.24 of type {6,51} Reflexible Genus 17 map R17.24* of type {51,6} Reflexible Group <102,3> Number of orientably-regular maps = 2 Genus 0 map R0.50 of type {2,51} Reflexible Genus 0 map R0.50* of type {51,2} Reflexible Group <102,4> Number of orientably-regular maps = 2 Genus 25 map R25.42 of type {51,102} Reflexible Genus 25 map R25.42* of type {102,51} Reflexible ............................................................................... Groups of order 104 Total = 14 Group <104,2> Number of orientably-regular maps = 1 Genus 26 map R26.16 of type {104,104} Reflexible Self-dual Group <104,5> Number of orientably-regular maps = 2 Genus 13 map R13.7 of type {4,52} Reflexible Genus 13 map R13.7* of type {52,4} Reflexible Group <104,6> Number of orientably-regular maps = 2 Genus 0 map R0.51 of type {2,52} Reflexible Genus 0 map R0.51* of type {52,2} Reflexible Group <104,8> Number of orientably-regular maps = 2 Genus 12 map R12.2 of type {4,26} Reflexible Genus 12 map R12.2* of type {26,4} Reflexible Group <104,9> Number of orientably-regular maps = 1 Genus 25 map R25.43 of type {52,52} Reflexible Self-dual Group <104,10> Number of orientably-regular maps = 2 Genus 24 map R24.12 of type {26,52} Reflexible Genus 24 map R24.12* of type {52,26} Reflexible Group <104,12> Number of orientably-regular maps = 2 Genus 1 map C1.21 of type {4,4} Chiral Self-dual Genus 1 map C1.21# of type {4,4} Chiral Self-dual ............................................................................... Groups of order 106 Total = 2 Group <106,1> Number of orientably-regular maps = 2 Genus 0 map R0.52 of type {2,53} Reflexible Genus 0 map R0.52* of type {53,2} Reflexible Group <106,2> Number of orientably-regular maps = 2 Genus 26 map R26.14 of type {53,106} Reflexible Genus 26 map R26.14* of type {106,53} Reflexible ............................................................................... Groups of order 108 Total = 45 Group <108,2> Number of orientably-regular maps = 1 Genus 27 map R27.18 of type {108,108} Reflexible Self-dual Group <108,3> Number of orientably-regular maps = 1 Genus 24 map R24.13 of type {27,27} Reflexible Self-dual Group <108,4> Number of orientably-regular maps = 2 Genus 0 map R0.53 of type {2,54} Reflexible Genus 0 map R0.53* of type {54,2} Reflexible Group <108,5> Number of orientably-regular maps = 1 Genus 26 map R26.15 of type {54,54} Reflexible Self-dual Group <108,15> Number of orientably-regular maps = 3 Genus 10 map R10.10 of type {4,12} Reflexible Genus 10 map R10.10* of type {12,4} Reflexible Genus 19 map R19.28 of type {12,12} Reflexible Self-dual Group <108,16> Number of orientably-regular maps = 2 Genus 16 map R16.8 of type {6,18} Reflexible Genus 16 map R16.8* of type {18,6} Reflexible Group <108,17> Number of orientably-regular maps = 1 Genus 10 map R10.14 of type {6,6} Reflexible Self-dual Group <108,23> Number of orientably-regular maps = 2 Genus 16 map R16.9 of type {6,18} Reflexible Genus 16 map R16.9* of type {18,6} Reflexible Group <108,24> Number of orientably-regular maps = 2 Genus 22 map R22.15 of type {18,18} Reflexible Non-self-dual Genus 22 map R22.15* of type {18,18} Reflexible Non-self-dual Group <108,25> Number of orientably-regular maps = 2 Genus 10 map R10.15 of type {6,6} Reflexible Non-self-dual Genus 10 map R10.15* of type {6,6} Reflexible Non-self-dual Group <108,26> Number of orientably-regular maps = 4 Genus 16 map C16.1 of type {6,18} Chiral Genus 16 map C16.1# of type {6,18} Chiral Genus 16 map C16.1* of type {18,6} Chiral Genus 16 map C16.1*# of type {18,6} Chiral Group <108,36> Number of orientably-regular maps = 1 Genus 19 map R19.27 of type {12,12} Reflexible Self-dual Group <108,38> Number of orientably-regular maps = 1 Genus 10 map R10.13 of type {6,6} Reflexible Self-dual ............................................................................... Groups of order 110 Total = 6 Group <110,1> Number of orientably-regular maps = 8 Genus 12 map C12.1 of type {5,10} Chiral Genus 12 map C12.1# of type {5,10} Chiral Genus 12 map C12.1* of type {10,5} Chiral Genus 12 map C12.1*# of type {10,5} Chiral Genus 12 map C12.2 of type {5,10} Chiral Genus 12 map C12.2# of type {5,10} Chiral Genus 12 map C12.2* of type {10,5} Chiral Genus 12 map C12.2*# of type {10,5} Chiral Group <110,3> Number of orientably-regular maps = 2 Genus 25 map R25.40 of type {22,55} Reflexible Genus 25 map R25.40* of type {55,22} Reflexible Group <110,4> Number of orientably-regular maps = 2 Genus 22 map R22.14 of type {10,55} Reflexible Genus 22 map R22.14* of type {55,10} Reflexible Group <110,5> Number of orientably-regular maps = 2 Genus 0 map R0.54 of type {2,55} Reflexible Genus 0 map R0.54* of type {55,2} Reflexible Group <110,6> Number of orientably-regular maps = 2 Genus 27 map R27.15 of type {55,110} Reflexible Genus 27 map R27.15* of type {110,55} Reflexible ............................................................................... Groups of order 112 Total = 43 Group <112,2> Number of orientably-regular maps = 1 Genus 28 map R28.38 of type {112,112} Reflexible Self-dual Group <112,3> Number of orientably-regular maps = 2 Genus 21 map R21.29 of type {8,56} Reflexible Genus 21 map R21.29* of type {56,8} Reflexible Group <112,4> Number of orientably-regular maps = 2 Genus 21 map R21.28 of type {8,56} Reflexible Genus 21 map R21.28* of type {56,8} Reflexible Group <112,5> Number of orientably-regular maps = 2 Genus 14 map R14.5 of type {4,56} Reflexible Genus 14 map R14.5* of type {56,4} Reflexible Group <112,6> Number of orientably-regular maps = 2 Genus 0 map R0.55 of type {2,56} Reflexible Genus 0 map R0.55* of type {56,2} Reflexible Group <112,13> Number of orientably-regular maps = 2 Genus 13 map R13.6 of type {4,28} Reflexible Genus 13 map R13.6* of type {28,4} Reflexible Group <112,14> Number of orientably-regular maps = 2 Genus 18 map R18.5 of type {8,14} Reflexible Genus 18 map R18.5* of type {14,8} Reflexible Group <112,16> Number of orientably-regular maps = 2 Genus 20 map R20.6 of type {8,28} Reflexible Genus 20 map R20.6* of type {28,8} Reflexible Group <112,20> Number of orientably-regular maps = 1 Genus 25 map R25.41 of type {28,28} Reflexible Self-dual Group <112,22> Number of orientably-regular maps = 1 Genus 27 map R27.17 of type {56,56} Reflexible Self-dual Group <112,23> Number of orientably-regular maps = 1 Genus 27 map R27.16 of type {56,56} Reflexible Self-dual Group <112,24> Number of orientably-regular maps = 2 Genus 24 map R24.10 of type {14,56} Reflexible Genus 24 map R24.10* of type {56,14} Reflexible Group <112,25> Number of orientably-regular maps = 2 Genus 26 map R26.13 of type {28,56} Reflexible Genus 26 map R26.13* of type {56,28} Reflexible Group <112,41> Number of orientably-regular maps = 6 Genus 17 map C17.4 of type {7,14} Chiral Genus 17 map C17.4# of type {7,14} Chiral Genus 17 map C17.4* of type {14,7} Chiral Genus 17 map C17.4*# of type {14,7} Chiral Genus 21 map C21.9 of type {14,14} Chiral Mirror-self-dual Genus 21 map C21.9# of type {14,14} Chiral Mirror-self-dual ............................................................................... Groups of order 114 Total = 6 Group <114,1> Number of orientably-regular maps = 4 Genus 1 map C1.3 of type {3,6} Chiral Genus 1 map C1.3# of type {3,6} Chiral Genus 1 map C1.3* of type {6,3} Chiral Genus 1 map C1.3*# of type {6,3} Chiral Group <114,3> Number of orientably-regular maps = 2 Genus 27 map R27.14 of type {38,57} Reflexible Genus 27 map R27.14* of type {57,38} Reflexible Group <114,4> Number of orientably-regular maps = 2 Genus 19 map R19.22 of type {6,57} Reflexible Genus 19 map R19.22* of type {57,6} Reflexible Group <114,5> Number of orientably-regular maps = 2 Genus 0 map R0.56 of type {2,57} Reflexible Genus 0 map R0.56* of type {57,2} Reflexible Group <114,6> Number of orientably-regular maps = 2 Genus 28 map R28.36 of type {57,114} Reflexible Genus 28 map R28.36* of type {114,57} Reflexible ............................................................................... Groups of order 116 Total = 5 Group <116,2> Number of orientably-regular maps = 1 Genus 29 map R29.32 of type {116,116} Reflexible Self-dual Group <116,3> Number of orientably-regular maps = 2 Genus 1 map C1.22 of type {4,4} Chiral Self-dual Genus 1 map C1.22# of type {4,4} Chiral Self-dual Group <116,4> Number of orientably-regular maps = 2 Genus 0 map R0.57 of type {2,58} Reflexible Genus 0 map R0.57* of type {58,2} Reflexible Group <116,5> Number of orientably-regular maps = 1 Genus 28 map R28.37 of type {58,58} Reflexible Self-dual ............................................................................... Groups of order 118 Total = 2 Group <118,1> Number of orientably-regular maps = 2 Genus 0 map R0.58 of type {2,59} Reflexible Genus 0 map R0.58* of type {59,2} Reflexible Group <118,2> Number of orientably-regular maps = 2 Genus 29 map R29.30 of type {59,118} Reflexible Genus 29 map R29.30* of type {118,59} Reflexible ............................................................................... Groups of order 120 Total = 47 Group <120,4> Number of orientably-regular maps = 1 Genus 30 map R30.13 of type {120,120} Reflexible Self-dual Group <120,10> Number of orientably-regular maps = 2 Genus 23 map R23.7 of type {12,20} Reflexible Genus 23 map R23.7* of type {20,12} Reflexible Group <120,12> Number of orientably-regular maps = 2 Genus 18 map R18.4 of type {6,20} Reflexible Genus 18 map R18.4* of type {20,6} Reflexible Group <120,13> Number of orientably-regular maps = 2 Genus 20 map R20.7 of type {10,12} Reflexible Genus 20 map R20.7* of type {12,10} Reflexible Group <120,17> Number of orientably-regular maps = 2 Genus 25 map R25.30 of type {12,60} Reflexible Genus 25 map R25.30* of type {60,12} Reflexible Group <120,18> Number of orientably-regular maps = 2 Genus 20 map R20.4 of type {6,60} Reflexible Genus 20 map R20.4* of type {60,6} Reflexible Group <120,20> Number of orientably-regular maps = 2 Genus 24 map R24.9 of type {12,30} Reflexible Genus 24 map R24.9* of type {30,12} Reflexible Group <120,22> Number of orientably-regular maps = 2 Genus 27 map R27.12 of type {20,60} Reflexible Genus 27 map R27.12* of type {60,20} Reflexible Group <120,23> Number of orientably-regular maps = 2 Genus 24 map R24.8 of type {10,60} Reflexible Genus 24 map R24.8* of type {60,10} Reflexible Group <120,25> Number of orientably-regular maps = 2 Genus 26 map R26.12 of type {20,30} Reflexible Genus 26 map R26.12* of type {30,20} Reflexible Group <120,27> Number of orientably-regular maps = 2 Genus 15 map R15.8 of type {4,60} Reflexible Genus 15 map R15.8* of type {60,4} Reflexible Group <120,28> Number of orientably-regular maps = 2 Genus 0 map R0.59 of type {2,60} Reflexible Genus 0 map R0.59* of type {60,2} Reflexible Group <120,30> Number of orientably-regular maps = 2 Genus 14 map R14.4 of type {4,30} Reflexible Genus 14 map R14.4* of type {30,4} Reflexible Group <120,31> Number of orientably-regular maps = 1 Genus 29 map R29.31 of type {60,60} Reflexible Self-dual Group <120,32> Number of orientably-regular maps = 2 Genus 28 map R28.35 of type {30,60} Reflexible Genus 28 map R28.35* of type {60,30} Reflexible Group <120,34> Number of orientably-regular maps = 7 Genus 4 map R4.2 of type {4,5} Reflexible Genus 4 map R4.2* of type {5,4} Reflexible Genus 6 map R6.2 of type {4,6} Reflexible Genus 6 map R6.2* of type {6,4} Reflexible Genus 9 map R9.16 of type {5,6} Reflexible Genus 9 map R9.16* of type {6,5} Reflexible Genus 11 map R11.5 of type {6,6} Reflexible Self-dual Group <120,35> Number of orientably-regular maps = 9 Genus 5 map R5.2 of type {3,10} Reflexible Genus 5 map R5.2* of type {10,3} Reflexible Genus 9 map R9.15 of type {5,6} Reflexible Genus 9 map R9.15* of type {6,5} Reflexible Genus 13 map R13.8 of type {5,10} Reflexible Genus 13 map R13.8* of type {10,5} Reflexible Genus 15 map R15.9 of type {6,10} Reflexible Genus 15 map R15.9* of type {10,6} Reflexible Genus 19 map R19.26 of type {10,10} Reflexible Self-dual Group <120,36> Number of orientably-regular maps = 4 Genus 11 map C11.3 of type {4,12} Chiral Genus 11 map C11.3# of type {4,12} Chiral Genus 11 map C11.3* of type {12,4} Chiral Genus 11 map C11.3*# of type {12,4} Chiral Group <120,37> Number of orientably-regular maps = 2 Genus 24 map R24.11 of type {15,20} Reflexible Genus 24 map R24.11* of type {20,15} Reflexible Group <120,38> Number of orientably-regular maps = 2 Genus 12 map R12.1 of type {4,15} Reflexible Genus 12 map R12.1* of type {15,4} Reflexible Group <120,39> Number of orientably-regular maps = 2 Genus 17 map R17.23 of type {6,15} Reflexible Genus 17 map R17.23* of type {15,6} Reflexible Group <120,40> Number of orientably-regular maps = 2 Genus 21 map C21.8 of type {12,12} Chiral Self-dual Genus 21 map C21.8# of type {12,12} Chiral Self-dual Group <120,43> Number of orientably-regular maps = 3 Genus 25 map R25.31 of type {15,30} Reflexible Genus 25 map R25.31* of type {30,15} Reflexible Genus 27 map R27.13 of type {30,30} Reflexible Self-dual ............................................................................... Groups of order 122 Total = 2 Group <122,1> Number of orientably-regular maps = 2 Genus 0 map R0.60 of type {2,61} Reflexible Genus 0 map R0.60* of type {61,2} Reflexible Group <122,2> Number of orientably-regular maps = 2 Genus 30 map R30.11 of type {61,122} Reflexible Genus 30 map R30.11* of type {122,61} Reflexible ............................................................................... Groups of order 124 Total = 4 Group <124,2> Number of orientably-regular maps = 1 Genus 31 map R31.24 of type {124,124} Reflexible Self-dual Group <124,3> Number of orientably-regular maps = 2 Genus 0 map R0.61 of type {2,62} Reflexible Genus 0 map R0.61* of type {62,2} Reflexible Group <124,4> Number of orientably-regular maps = 1 Genus 30 map R30.12 of type {62,62} Reflexible Self-dual ............................................................................... Groups of order 126 Total = 16 Group <126,1> Number of orientably-regular maps = 4 Genus 22 map C22.6 of type {9,18} Chiral Genus 22 map C22.6# of type {9,18} Chiral Genus 22 map C22.6* of type {18,9} Chiral Genus 22 map C22.6*# of type {18,9} Chiral Group <126,3> Number of orientably-regular maps = 2 Genus 27 map R27.11 of type {14,63} Reflexible Genus 27 map R27.11* of type {63,14} Reflexible Group <126,4> Number of orientably-regular maps = 2 Genus 28 map R28.33 of type {18,63} Reflexible Genus 28 map R28.33* of type {63,18} Reflexible Group <126,5> Number of orientably-regular maps = 2 Genus 0 map R0.62 of type {2,63} Reflexible Genus 0 map R0.62* of type {63,2} Reflexible Group <126,6> Number of orientably-regular maps = 2 Genus 31 map R31.21 of type {63,126} Reflexible Genus 31 map R31.21* of type {126,63} Reflexible Group <126,9> Number of orientably-regular maps = 4 Genus 1 map C1.4 of type {3,6} Chiral Genus 1 map C1.4# of type {3,6} Chiral Genus 1 map C1.4* of type {6,3} Chiral Genus 1 map C1.4*# of type {6,3} Chiral Group <126,12> Number of orientably-regular maps = 2 Genus 28 map R28.34 of type {21,42} Reflexible Genus 28 map R28.34* of type {42,21} Reflexible Group <126,13> Number of orientably-regular maps = 2 Genus 19 map R19.21 of type {6,21} Reflexible Genus 19 map R19.21* of type {21,6} Reflexible ............................................................................... Groups of order 128 Total = 2328 Group <128,1> Number of orientably-regular maps = 1 Genus 32 map R32.13 of type {128,128} Reflexible Self-dual Group <128,2> Number of orientably-regular maps = 1 Genus 17 map R17.25 of type {8,8} Reflexible Self-dual Group <128,46> Number of orientably-regular maps = 1 Genus 25 map R25.38 of type {16,16} Reflexible Self-dual Group <128,47> Number of orientably-regular maps = 1 Genus 25 map R25.39 of type {16,16} Reflexible Self-dual Group <128,48> Number of orientably-regular maps = 1 Genus 17 map R17.31 of type {8,8} Reflexible Self-dual Group <128,50> Number of orientably-regular maps = 1 Genus 17 map R17.28 of type {8,8} Reflexible Self-dual Group <128,52> Number of orientably-regular maps = 1 Genus 25 map R25.36 of type {16,16} Reflexible Self-dual Group <128,53> Number of orientably-regular maps = 1 Genus 25 map R25.37 of type {16,16} Reflexible Self-dual Group <128,61> Number of orientably-regular maps = 2 Genus 25 map R25.33 of type {16,16} Reflexible Non-self-dual Genus 25 map R25.33* of type {16,16} Reflexible Non-self-dual Group <128,62> Number of orientably-regular maps = 2 Genus 25 map R25.32 of type {16,16} Reflexible Non-self-dual Genus 25 map R25.32* of type {16,16} Reflexible Non-self-dual Group <128,63> Number of orientably-regular maps = 2 Genus 21 map R21.21 of type {8,16} Reflexible Genus 21 map R21.21* of type {16,8} Reflexible Group <128,65> Number of orientably-regular maps = 2 Genus 21 map R21.24 of type {8,16} Reflexible Genus 21 map R21.24* of type {16,8} Reflexible Group <128,67> Number of orientably-regular maps = 2 Genus 21 map R21.27 of type {8,16} Reflexible Genus 21 map R21.27* of type {16,8} Reflexible Group <128,68> Number of orientably-regular maps = 2 Genus 21 map R21.26 of type {8,16} Reflexible Genus 21 map R21.26* of type {16,8} Reflexible Group <128,71> Number of orientably-regular maps = 2 Genus 13 map R13.5 of type {4,16} Reflexible Genus 13 map R13.5* of type {16,4} Reflexible Group <128,73> Number of orientably-regular maps = 2 Genus 21 map R21.22 of type {8,16} Reflexible Genus 21 map R21.22* of type {16,8} Reflexible Group <128,75> Number of orientably-regular maps = 2 Genus 9 map R9.7 of type {4,8} Reflexible Genus 9 map R9.7* of type {8,4} Reflexible Group <128,77> Number of orientably-regular maps = 2 Genus 17 map R17.26 of type {8,8} Reflexible Non-self-dual Genus 17 map R17.26* of type {8,8} Reflexible Non-self-dual Group <128,79> Number of orientably-regular maps = 2 Genus 13 map R13.4 of type {4,16} Reflexible Genus 13 map R13.4* of type {16,4} Reflexible Group <128,81> Number of orientably-regular maps = 2 Genus 21 map R21.23 of type {8,16} Reflexible Genus 21 map R21.23* of type {16,8} Reflexible Group <128,87> Number of orientably-regular maps = 2 Genus 25 map C25.4 of type {16,16} Chiral Self-dual Genus 25 map C25.4# of type {16,16} Chiral Self-dual Group <128,89> Number of orientably-regular maps = 1 Genus 25 map R25.34 of type {16,16} Reflexible Self-dual Group <128,91> Number of orientably-regular maps = 1 Genus 25 map R25.35 of type {16,16} Reflexible Self-dual Group <128,92> Number of orientably-regular maps = 2 Genus 21 map R21.25 of type {8,16} Reflexible Genus 21 map R21.25* of type {16,8} Reflexible Group <128,93> Number of orientably-regular maps = 2 Genus 21 map R21.20 of type {8,16} Reflexible Genus 21 map R21.20* of type {16,8} Reflexible Group <128,131> Number of orientably-regular maps = 1 Genus 29 map R29.27 of type {32,32} Reflexible Self-dual Group <128,132> Number of orientably-regular maps = 1 Genus 29 map R29.29 of type {32,32} Reflexible Self-dual Group <128,133> Number of orientably-regular maps = 2 Genus 29 map R29.28 of type {32,32} Reflexible Non-self-dual Genus 29 map R29.28* of type {32,32} Reflexible Non-self-dual Group <128,134> Number of orientably-regular maps = 2 Genus 9 map R9.6 of type {4,8} Reflexible Genus 9 map R9.6* of type {8,4} Reflexible Group <128,135> Number of orientably-regular maps = 2 Genus 17 map R17.29 of type {8,8} Reflexible Non-self-dual Genus 17 map R17.29* of type {8,8} Reflexible Non-self-dual Group <128,136> Number of orientably-regular maps = 2 Genus 9 map R9.5 of type {4,8} Reflexible Genus 9 map R9.5* of type {8,4} Reflexible Group <128,137> Number of orientably-regular maps = 2 Genus 17 map R17.30 of type {8,8} Reflexible Non-self-dual Genus 17 map R17.30* of type {8,8} Reflexible Non-self-dual Group <128,138> Number of orientably-regular maps = 2 Genus 9 map R9.8 of type {4,8} Reflexible Genus 9 map R9.8* of type {8,4} Reflexible Group <128,140> Number of orientably-regular maps = 1 Genus 1 map R1.21 of type {4,4} Reflexible Self-dual Group <128,142> Number of orientably-regular maps = 1 Genus 17 map R17.27 of type {8,8} Reflexible Self-dual Group <128,147> Number of orientably-regular maps = 2 Genus 15 map R15.7 of type {4,32} Reflexible Genus 15 map R15.7* of type {32,4} Reflexible Group <128,149> Number of orientably-regular maps = 2 Genus 23 map R23.6 of type {8,32} Reflexible Genus 23 map R23.6* of type {32,8} Reflexible Group <128,150> Number of orientably-regular maps = 2 Genus 15 map R15.6 of type {4,32} Reflexible Genus 15 map R15.6* of type {32,4} Reflexible Group <128,151> Number of orientably-regular maps = 2 Genus 23 map R23.5 of type {8,32} Reflexible Genus 23 map R23.5* of type {32,8} Reflexible Group <128,159> Number of orientably-regular maps = 1 Genus 31 map R31.23 of type {64,64} Reflexible Self-dual Group <128,160> Number of orientably-regular maps = 1 Genus 31 map R31.22 of type {64,64} Reflexible Self-dual Group <128,161> Number of orientably-regular maps = 2 Genus 0 map R0.63 of type {2,64} Reflexible Genus 0 map R0.63* of type {64,2} Reflexible Group <128,162> Number of orientably-regular maps = 2 Genus 16 map R16.5 of type {4,64} Reflexible Genus 16 map R16.5* of type {64,4} Reflexible ............................................................................... Groups of order 130 Total = 4 Group <130,1> Number of orientably-regular maps = 2 Genus 30 map R30.9 of type {26,65} Reflexible Genus 30 map R30.9* of type {65,26} Reflexible Group <130,2> Number of orientably-regular maps = 2 Genus 26 map R26.11 of type {10,65} Reflexible Genus 26 map R26.11* of type {65,10} Reflexible Group <130,3> Number of orientably-regular maps = 2 Genus 0 map R0.64 of type {2,65} Reflexible Genus 0 map R0.64* of type {65,2} Reflexible Group <130,4> Number of orientably-regular maps = 2 Genus 32 map R32.11 of type {65,130} Reflexible Genus 32 map R32.11* of type {130,65} Reflexible ............................................................................... Groups of order 132 Total = 10 Group <132,4> Number of orientably-regular maps = 1 Genus 33 map R33.84 of type {132,132} Reflexible Self-dual Group <132,5> Number of orientably-regular maps = 2 Genus 20 map R20.3 of type {6,22} Reflexible Genus 20 map R20.3* of type {22,6} Reflexible Group <132,6> Number of orientably-regular maps = 1 Genus 30 map R30.10 of type {33,33} Reflexible Self-dual Group <132,7> Number of orientably-regular maps = 2 Genus 22 map R22.12 of type {6,66} Reflexible Genus 22 map R22.12* of type {66,6} Reflexible Group <132,8> Number of orientably-regular maps = 2 Genus 30 map R30.8 of type {22,66} Reflexible Genus 30 map R30.8* of type {66,22} Reflexible Group <132,9> Number of orientably-regular maps = 2 Genus 0 map R0.65 of type {2,66} Reflexible Genus 0 map R0.65* of type {66,2} Reflexible Group <132,10> Number of orientably-regular maps = 1 Genus 32 map R32.12 of type {66,66} Reflexible Self-dual ............................................................................... Groups of order 134 Total = 2 Group <134,1> Number of orientably-regular maps = 2 Genus 0 map R0.66 of type {2,67} Reflexible Genus 0 map R0.66* of type {67,2} Reflexible Group <134,2> Number of orientably-regular maps = 2 Genus 33 map R33.82 of type {67,134} Reflexible Genus 33 map R33.82* of type {134,67} Reflexible ............................................................................... Groups of order 136 Total = 15 Group <136,2> Number of orientably-regular maps = 1 Genus 34 map R34.19 of type {136,136} Reflexible Self-dual Group <136,5> Number of orientably-regular maps = 2 Genus 17 map R17.15 of type {4,68} Reflexible Genus 17 map R17.15* of type {68,4} Reflexible Group <136,6> Number of orientably-regular maps = 2 Genus 0 map R0.67 of type {2,68} Reflexible Genus 0 map R0.67* of type {68,2} Reflexible Group <136,8> Number of orientably-regular maps = 2 Genus 16 map R16.4 of type {4,34} Reflexible Genus 16 map R16.4* of type {34,4} Reflexible Group <136,9> Number of orientably-regular maps = 1 Genus 33 map R33.83 of type {68,68} Reflexible Self-dual Group <136,10> Number of orientably-regular maps = 2 Genus 32 map R32.10 of type {34,68} Reflexible Genus 32 map R32.10* of type {68,34} Reflexible Group <136,12> Number of orientably-regular maps = 4 Genus 18 map C18.1 of type {8,8} Chiral Non-SD Non-MSD Genus 18 map C18.1# of type {8,8} Chiral Non-SD Non-MSD Genus 18 map C18.1* of type {8,8} Chiral Non-SD Non-MSD Genus 18 map C18.1*# of type {8,8} Chiral Non-SD Non-MSD Group <136,13> Number of orientably-regular maps = 2 Genus 1 map C1.23 of type {4,4} Chiral Self-dual Genus 1 map C1.23# of type {4,4} Chiral Self-dual ............................................................................... Groups of order 138 Total = 4 Group <138,1> Number of orientably-regular maps = 2 Genus 33 map R33.81 of type {46,69} Reflexible Genus 33 map R33.81* of type {69,46} Reflexible Group <138,2> Number of orientably-regular maps = 2 Genus 23 map R23.4 of type {6,69} Reflexible Genus 23 map R23.4* of type {69,6} Reflexible Group <138,3> Number of orientably-regular maps = 2 Genus 0 map R0.68 of type {2,69} Reflexible Genus 0 map R0.68* of type {69,2} Reflexible Group <138,4> Number of orientably-regular maps = 2 Genus 34 map R34.17 of type {69,138} Reflexible Genus 34 map R34.17* of type {138,69} Reflexible ............................................................................... Groups of order 140 Total = 11 Group <140,4> Number of orientably-regular maps = 1 Genus 35 map R35.20 of type {140,140} Reflexible Self-dual Group <140,5> Number of orientably-regular maps = 2 Genus 31 map C31.6 of type {28,28} Chiral Self-dual Genus 31 map C31.6# of type {28,28} Chiral Self-dual Group <140,7> Number of orientably-regular maps = 2 Genus 24 map R24.7 of type {10,14} Reflexible Genus 24 map R24.7* of type {14,10} Reflexible Group <140,8> Number of orientably-regular maps = 2 Genus 28 map R28.29 of type {10,70} Reflexible Genus 28 map R28.29* of type {70,10} Reflexible Group <140,9> Number of orientably-regular maps = 2 Genus 30 map R30.7 of type {14,70} Reflexible Genus 30 map R30.7* of type {70,14} Reflexible Group <140,10> Number of orientably-regular maps = 2 Genus 0 map R0.69 of type {2,70} Reflexible Genus 0 map R0.69* of type {70,2} Reflexible Group <140,11> Number of orientably-regular maps = 1 Genus 34 map R34.18 of type {70,70} Reflexible Self-dual ............................................................................... Groups of order 142 Total = 2 Group <142,1> Number of orientably-regular maps = 2 Genus 0 map R0.70 of type {2,71} Reflexible Genus 0 map R0.70* of type {71,2} Reflexible Group <142,2> Number of orientably-regular maps = 2 Genus 35 map R35.17 of type {71,142} Reflexible Genus 35 map R35.17* of type {142,71} Reflexible ............................................................................... Groups of order 144 Total = 197 Group <144,2> Number of orientably-regular maps = 1 Genus 36 map R36.30 of type {144,144} Reflexible Self-dual Group <144,5> Number of orientably-regular maps = 2 Genus 27 map R27.9 of type {8,72} Reflexible Genus 27 map R27.9* of type {72,8} Reflexible Group <144,6> Number of orientably-regular maps = 2 Genus 27 map R27.8 of type {8,72} Reflexible Genus 27 map R27.8* of type {72,8} Reflexible Group <144,7> Number of orientably-regular maps = 2 Genus 18 map R18.3 of type {4,72} Reflexible Genus 18 map R18.3* of type {72,4} Reflexible Group <144,8> Number of orientably-regular maps = 2 Genus 0 map R0.71 of type {2,72} Reflexible Genus 0 map R0.71* of type {72,2} Reflexible Group <144,14> Number of orientably-regular maps = 2 Genus 17 map R17.14 of type {4,36} Reflexible Genus 17 map R17.14* of type {36,4} Reflexible Group <144,16> Number of orientably-regular maps = 2 Genus 24 map R24.6 of type {8,18} Reflexible Genus 24 map R24.6* of type {18,8} Reflexible Group <144,18> Number of orientably-regular maps = 2 Genus 26 map R26.9 of type {8,36} Reflexible Genus 26 map R26.9* of type {36,8} Reflexible Group <144,21> Number of orientably-regular maps = 1 Genus 33 map R33.80 of type {36,36} Reflexible Self-dual Group <144,23> Number of orientably-regular maps = 1 Genus 35 map R35.19 of type {72,72} Reflexible Self-dual Group <144,24> Number of orientably-regular maps = 1 Genus 35 map R35.18 of type {72,72} Reflexible Self-dual Group <144,25> Number of orientably-regular maps = 2 Genus 32 map R32.9 of type {18,72} Reflexible Genus 32 map R32.9* of type {72,18} Reflexible Group <144,26> Number of orientably-regular maps = 2 Genus 34 map R34.16 of type {36,72} Reflexible Genus 34 map R34.16* of type {72,36} Reflexible Group <144,32> Number of orientably-regular maps = 4 Genus 20 map R20.5 of type {8,9} Reflexible Genus 20 map R20.5* of type {9,8} Reflexible Genus 24 map R24.5 of type {8,18} Reflexible Genus 24 map R24.5* of type {18,8} Reflexible Group <144,34> Number of orientably-regular maps = 2 Genus 33 map R33.78 of type {36,36} Reflexible Self-dual Genus 33 map R33.79 of type {36,36} Reflexible Self-dual Group <144,36> Number of orientably-regular maps = 4 Genus 27 map R27.10 of type {9,36} Reflexible Genus 27 map R27.10* of type {36,9} Reflexible Genus 31 map R31.16 of type {18,36} Reflexible Genus 31 map R31.16* of type {36,18} Reflexible Group <144,53> Number of orientably-regular maps = 1 Genus 31 map R31.19 of type {24,24} Reflexible Self-dual Group <144,55> Number of orientably-regular maps = 1 Genus 31 map R31.18 of type {24,24} Reflexible Self-dual Group <144,57> Number of orientably-regular maps = 2 Genus 22 map R22.8 of type {6,24} Reflexible Genus 22 map R22.8* of type {24,6} Reflexible Group <144,60> Number of orientably-regular maps = 2 Genus 28 map R28.31 of type {12,24} Reflexible Genus 28 map R28.31* of type {24,12} Reflexible Group <144,65> Number of orientably-regular maps = 1 Genus 25 map R25.29 of type {12,12} Reflexible Self-dual Group <144,69> Number of orientably-regular maps = 2 Genus 31 map R31.20 of type {24,24} Reflexible Non-self-dual Genus 31 map R31.20* of type {24,24} Reflexible Non-self-dual Group <144,70> Number of orientably-regular maps = 2 Genus 31 map R31.17 of type {24,24} Reflexible Non-self-dual Genus 31 map R31.17* of type {24,24} Reflexible Non-self-dual Group <144,71> Number of orientably-regular maps = 2 Genus 28 map R28.30 of type {12,24} Reflexible Genus 28 map R28.30* of type {24,12} Reflexible Group <144,72> Number of orientably-regular maps = 2 Genus 22 map R22.10 of type {6,24} Reflexible Genus 22 map R22.10* of type {24,6} Reflexible Group <144,79> Number of orientably-regular maps = 2 Genus 25 map R25.28 of type {12,12} Reflexible Non-self-dual Genus 25 map R25.28* of type {12,12} Reflexible Non-self-dual Group <144,80> Number of orientably-regular maps = 2 Genus 22 map R22.9 of type {6,24} Reflexible Genus 22 map R22.9* of type {24,6} Reflexible Group <144,82> Number of orientably-regular maps = 2 Genus 28 map R28.32 of type {12,24} Reflexible Genus 28 map R28.32* of type {24,12} Reflexible Group <144,109> Number of orientably-regular maps = 2 Genus 15 map R15.5 of type {4,18} Reflexible Genus 15 map R15.5* of type {18,4} Reflexible Group <144,110> Number of orientably-regular maps = 1 Genus 29 map R29.26 of type {18,18} Reflexible Self-dual Group <144,115> Number of orientably-regular maps = 2 Genus 13 map R13.3 of type {4,12} Reflexible Genus 13 map R13.3* of type {12,4} Reflexible Group <144,117> Number of orientably-regular maps = 2 Genus 16 map R16.7 of type {6,8} Reflexible Genus 16 map R16.7* of type {8,6} Reflexible Group <144,118> Number of orientably-regular maps = 2 Genus 22 map R22.13 of type {8,12} Reflexible Genus 22 map R22.13* of type {12,8} Reflexible Group <144,122> Number of orientably-regular maps = 4 Genus 10 map R10.5 of type {3,24} Reflexible Genus 10 map R10.5* of type {24,3} Reflexible Genus 22 map R22.11 of type {6,24} Reflexible Genus 22 map R22.11* of type {24,6} Reflexible Group <144,127> Number of orientably-regular maps = 4 Genus 7 map R7.2 of type {3,12} Reflexible Genus 7 map R7.2* of type {12,3} Reflexible Genus 19 map R19.20 of type {6,12} Reflexible Genus 19 map R19.20* of type {12,6} Reflexible Group <144,130> Number of orientably-regular maps = 1 Genus 19 map R19.25 of type {8,8} Reflexible Self-dual Group <144,131> Number of orientably-regular maps = 1 Genus 19 map R19.24 of type {8,8} Reflexible Self-dual Group <144,136> Number of orientably-regular maps = 1 Genus 1 map R1.22 of type {4,4} Reflexible Self-dual Group <144,182> Number of orientably-regular maps = 4 Genus 10 map C10.2 of type {4,8} Chiral Genus 10 map C10.2# of type {4,8} Chiral Genus 10 map C10.2* of type {8,4} Chiral Genus 10 map C10.2*# of type {8,4} Chiral Group <144,183> Number of orientably-regular maps = 2 Genus 19 map R19.19 of type {6,12} Reflexible Genus 19 map R19.19* of type {12,6} Reflexible Group <144,185> Number of orientably-regular maps = 2 Genus 19 map C19.2 of type {8,8} Chiral Self-dual Genus 19 map C19.2# of type {8,8} Chiral Self-dual Group <144,188> Number of orientably-regular maps = 2 Genus 19 map R19.18 of type {6,12} Reflexible Genus 19 map R19.18* of type {12,6} Reflexible Group <144,190> Number of orientably-regular maps = 2 Genus 13 map R13.9 of type {6,6} Reflexible Non-self-dual Genus 13 map R13.9* of type {6,6} Reflexible Non-self-dual ............................................................................... Groups of order 146 Total = 2 Group <146,1> Number of orientably-regular maps = 2 Genus 0 map R0.72 of type {2,73} Reflexible Genus 0 map R0.72* of type {73,2} Reflexible Group <146,2> Number of orientably-regular maps = 2 Genus 36 map R36.28 of type {73,146} Reflexible Genus 36 map R36.28* of type {146,73} Reflexible ............................................................................... Groups of order 148 Total = 5 Group <148,2> Number of orientably-regular maps = 1 Genus 37 map R37.55 of type {148,148} Reflexible Self-dual Group <148,3> Number of orientably-regular maps = 2 Genus 1 map C1.24 of type {4,4} Chiral Self-dual Genus 1 map C1.24# of type {4,4} Chiral Self-dual Group <148,4> Number of orientably-regular maps = 2 Genus 0 map R0.73 of type {2,74} Reflexible Genus 0 map R0.73* of type {74,2} Reflexible Group <148,5> Number of orientably-regular maps = 1 Genus 36 map R36.29 of type {74,74} Reflexible Self-dual ............................................................................... Groups of order 150 Total = 13 Group <150,1> Number of orientably-regular maps = 2 Genus 36 map R36.27 of type {50,75} Reflexible Genus 36 map R36.27* of type {75,50} Reflexible Group <150,2> Number of orientably-regular maps = 2 Genus 25 map R25.25 of type {6,75} Reflexible Genus 25 map R25.25* of type {75,6} Reflexible Group <150,3> Number of orientably-regular maps = 2 Genus 0 map R0.74 of type {2,75} Reflexible Genus 0 map R0.74* of type {75,2} Reflexible Group <150,4> Number of orientably-regular maps = 2 Genus 37 map R37.53 of type {75,150} Reflexible Genus 37 map R37.53* of type {150,75} Reflexible Group <150,5> Number of orientably-regular maps = 2 Genus 6 map R6.1 of type {3,10} Reflexible Genus 6 map R6.1* of type {10,3} Reflexible Group <150,6> Number of orientably-regular maps = 2 Genus 1 map R1.7 of type {3,6} Reflexible Genus 1 map R1.7* of type {6,3} Reflexible Group <150,8> Number of orientably-regular maps = 2 Genus 31 map R31.15 of type {15,30} Reflexible Genus 31 map R31.15* of type {30,15} Reflexible Group <150,11> Number of orientably-regular maps = 2 Genus 26 map R26.10 of type {10,15} Reflexible Genus 26 map R26.10* of type {15,10} Reflexible ............................................................................... Groups of order 152 Total = 12 Group <152,2> Number of orientably-regular maps = 1 Genus 38 map R38.12 of type {152,152} Reflexible Self-dual Group <152,4> Number of orientably-regular maps = 2 Genus 19 map R19.12 of type {4,76} Reflexible Genus 19 map R19.12* of type {76,4} Reflexible Group <152,5> Number of orientably-regular maps = 2 Genus 0 map R0.75 of type {2,76} Reflexible Genus 0 map R0.75* of type {76,2} Reflexible Group <152,7> Number of orientably-regular maps = 2 Genus 18 map R18.2 of type {4,38} Reflexible Genus 18 map R18.2* of type {38,4} Reflexible Group <152,8> Number of orientably-regular maps = 1 Genus 37 map R37.54 of type {76,76} Reflexible Self-dual Group <152,9> Number of orientably-regular maps = 2 Genus 36 map R36.25 of type {38,76} Reflexible Genus 36 map R36.25* of type {76,38} Reflexible ............................................................................... Groups of order 154 Total = 4 Group <154,1> Number of orientably-regular maps = 2 Genus 35 map R35.16 of type {22,77} Reflexible Genus 35 map R35.16* of type {77,22} Reflexible Group <154,2> Number of orientably-regular maps = 2 Genus 33 map R33.76 of type {14,77} Reflexible Genus 33 map R33.76* of type {77,14} Reflexible Group <154,3> Number of orientably-regular maps = 2 Genus 0 map R0.76 of type {2,77} Reflexible Genus 0 map R0.76* of type {77,2} Reflexible Group <154,4> Number of orientably-regular maps = 2 Genus 38 map R38.10 of type {77,154} Reflexible Genus 38 map R38.10* of type {154,77} Reflexible ............................................................................... Groups of order 156 Total = 18 Group <156,6> Number of orientably-regular maps = 1 Genus 39 map R39.21 of type {156,156} Reflexible Self-dual Group <156,7> Number of orientably-regular maps = 4 Genus 27 map C27.7 of type {12,12} Chiral Non-SD Non-MSD Genus 27 map C27.7# of type {12,12} Chiral Non-SD Non-MSD Genus 27 map C27.7* of type {12,12} Chiral Non-SD Non-MSD Genus 27 map C27.7*# of type {12,12} Chiral Non-SD Non-MSD Group <156,8> Number of orientably-regular maps = 4 Genus 14 map C14.1 of type {6,6} Chiral Non-SD Non-MSD Genus 14 map C14.1# of type {6,6} Chiral Non-SD Non-MSD Genus 14 map C14.1* of type {6,6} Chiral Non-SD Non-MSD Genus 14 map C14.1*# of type {6,6} Chiral Non-SD Non-MSD Group <156,9> Number of orientably-regular maps = 2 Genus 27 map C27.8 of type {12,12} Chiral Self-dual Genus 27 map C27.8# of type {12,12} Chiral Self-dual Group <156,11> Number of orientably-regular maps = 2 Genus 24 map R24.4 of type {6,26} Reflexible Genus 24 map R24.4* of type {26,6} Reflexible Group <156,13> Number of orientably-regular maps = 1 Genus 36 map R36.26 of type {39,39} Reflexible Self-dual Group <156,15> Number of orientably-regular maps = 2 Genus 26 map R26.8 of type {6,78} Reflexible Genus 26 map R26.8* of type {78,6} Reflexible Group <156,16> Number of orientably-regular maps = 2 Genus 36 map R36.24 of type {26,78} Reflexible Genus 36 map R36.24* of type {78,26} Reflexible Group <156,17> Number of orientably-regular maps = 2 Genus 0 map R0.77 of type {2,78} Reflexible Genus 0 map R0.77* of type {78,2} Reflexible Group <156,18> Number of orientably-regular maps = 1 Genus 38 map R38.11 of type {78,78} Reflexible Self-dual ............................................................................... Groups of order 158 Total = 2 Group <158,1> Number of orientably-regular maps = 2 Genus 0 map R0.78 of type {2,79} Reflexible Genus 0 map R0.78* of type {79,2} Reflexible Group <158,2> Number of orientably-regular maps = 2 Genus 39 map R39.18 of type {79,158} Reflexible Genus 39 map R39.18* of type {158,79} Reflexible ............................................................................... Groups of order 160 Total = 238 Group <160,2> Number of orientably-regular maps = 1 Genus 40 map R40.24 of type {160,160} Reflexible Self-dual Group <160,4> Number of orientably-regular maps = 2 Genus 35 map R35.13 of type {16,80} Reflexible Genus 35 map R35.13* of type {80,16} Reflexible Group <160,5> Number of orientably-regular maps = 2 Genus 35 map R35.12 of type {16,80} Reflexible Genus 35 map R35.12* of type {80,16} Reflexible Group <160,6> Number of orientably-regular maps = 2 Genus 0 map R0.79 of type {2,80} Reflexible Genus 0 map R0.79* of type {80,2} Reflexible Group <160,7> Number of orientably-regular maps = 2 Genus 20 map R20.2 of type {4,80} Reflexible Genus 20 map R20.2* of type {80,4} Reflexible Group <160,12> Number of orientably-regular maps = 2 Genus 27 map R27.7 of type {8,20} Reflexible Genus 27 map R27.7* of type {20,8} Reflexible Group <160,13> Number of orientably-regular maps = 2 Genus 17 map R17.13 of type {4,20} Reflexible Genus 17 map R17.13* of type {20,4} Reflexible Group <160,16> Number of orientably-regular maps = 2 Genus 27 map R27.6 of type {8,20} Reflexible Genus 27 map R27.6* of type {20,8} Reflexible Group <160,27> Number of orientably-regular maps = 2 Genus 29 map R29.25 of type {8,40} Reflexible Genus 29 map R29.25* of type {40,8} Reflexible Group <160,28> Number of orientably-regular maps = 2 Genus 19 map R19.10 of type {4,40} Reflexible Genus 19 map R19.10* of type {40,4} Reflexible Group <160,30> Number of orientably-regular maps = 2 Genus 29 map R29.24 of type {8,40} Reflexible Genus 29 map R29.24* of type {40,8} Reflexible Group <160,32> Number of orientably-regular maps = 2 Genus 19 map R19.11 of type {4,40} Reflexible Genus 19 map R19.11* of type {40,4} Reflexible Group <160,33> Number of orientably-regular maps = 2 Genus 28 map R28.28 of type {10,16} Reflexible Genus 28 map R28.28* of type {16,10} Reflexible Group <160,35> Number of orientably-regular maps = 2 Genus 32 map R32.8 of type {16,20} Reflexible Genus 32 map R32.8* of type {20,16} Reflexible Group <160,48> Number of orientably-regular maps = 1 Genus 37 map R37.51 of type {40,40} Reflexible Self-dual Group <160,49> Number of orientably-regular maps = 1 Genus 33 map R33.77 of type {20,20} Reflexible Self-dual Group <160,50> Number of orientably-regular maps = 1 Genus 37 map R37.52 of type {40,40} Reflexible Self-dual Group <160,52> Number of orientably-regular maps = 2 Genus 35 map R35.14 of type {20,40} Reflexible Genus 35 map R35.14* of type {40,20} Reflexible Group <160,54> Number of orientably-regular maps = 2 Genus 35 map R35.15 of type {20,40} Reflexible Genus 35 map R35.15* of type {40,20} Reflexible Group <160,59> Number of orientably-regular maps = 1 Genus 39 map R39.20 of type {80,80} Reflexible Self-dual Group <160,60> Number of orientably-regular maps = 1 Genus 39 map R39.19 of type {80,80} Reflexible Self-dual Group <160,61> Number of orientably-regular maps = 2 Genus 32 map R32.7 of type {10,80} Reflexible Genus 32 map R32.7* of type {80,10} Reflexible Group <160,62> Number of orientably-regular maps = 2 Genus 36 map R36.22 of type {20,80} Reflexible Genus 36 map R36.22* of type {80,20} Reflexible Group <160,64> Number of orientably-regular maps = 2 Genus 31 map C31.4 of type {16,16} Chiral Self-dual Genus 31 map C31.4# of type {16,16} Chiral Self-dual Group <160,65> Number of orientably-regular maps = 2 Genus 31 map C31.5 of type {16,16} Chiral Self-dual Genus 31 map C31.5# of type {16,16} Chiral Self-dual Group <160,74> Number of orientably-regular maps = 2 Genus 1 map C1.25 of type {4,4} Chiral Self-dual Genus 1 map C1.25# of type {4,4} Chiral Self-dual Group <160,78> Number of orientably-regular maps = 2 Genus 21 map C21.6 of type {8,8} Chiral Self-dual Genus 21 map C21.6# of type {8,8} Chiral Self-dual Group <160,82> Number of orientably-regular maps = 4 Genus 11 map C11.2 of type {4,8} Chiral Genus 11 map C11.2# of type {4,8} Chiral Genus 11 map C11.2* of type {8,4} Chiral Genus 11 map C11.2*# of type {8,4} Chiral Group <160,85> Number of orientably-regular maps = 4 Genus 11 map C11.1 of type {4,8} Chiral Genus 11 map C11.1# of type {4,8} Chiral Genus 11 map C11.1* of type {8,4} Chiral Genus 11 map C11.1*# of type {8,4} Chiral Group <160,88> Number of orientably-regular maps = 2 Genus 21 map C21.7 of type {8,8} Chiral Self-dual Genus 21 map C21.7# of type {8,8} Chiral Self-dual Group <160,199> Number of orientably-regular maps = 4 Genus 9 map R9.14 of type {5,5} Reflexible Self-dual Genus 17 map R17.17 of type {5,10} Reflexible Genus 17 map R17.17* of type {10,5} Reflexible Genus 25 map R25.27 of type {10,10} Reflexible Self-dual Group <160,234> Number of orientably-regular maps = 2 Genus 5 map R5.3 of type {4,5} Reflexible Genus 5 map R5.3* of type {5,4} Reflexible Group <160,235> Number of orientably-regular maps = 3 Genus 17 map R17.18 of type {5,10} Reflexible Genus 17 map R17.18* of type {10,5} Reflexible Genus 25 map R25.26 of type {10,10} Reflexible Self-dual ............................................................................... Groups of order 162 Total = 55 Group <162,1> Number of orientably-regular maps = 2 Genus 0 map R0.80 of type {2,81} Reflexible Genus 0 map R0.80* of type {81,2} Reflexible Group <162,2> Number of orientably-regular maps = 2 Genus 40 map R40.22 of type {81,162} Reflexible Genus 40 map R40.22* of type {162,81} Reflexible Group <162,3> Number of orientably-regular maps = 2 Genus 28 map R28.25 of type {9,18} Reflexible Genus 28 map R28.25* of type {18,9} Reflexible Group <162,4> Number of orientably-regular maps = 2 Genus 28 map R28.26 of type {9,18} Reflexible Genus 28 map R28.26* of type {18,9} Reflexible Group <162,5> Number of orientably-regular maps = 2 Genus 19 map R19.14 of type {6,9} Reflexible Genus 19 map R19.14* of type {9,6} Reflexible Group <162,6> Number of orientably-regular maps = 4 Genus 28 map C28.5 of type {9,18} Chiral Genus 28 map C28.5# of type {9,18} Chiral Genus 28 map C28.5* of type {18,9} Chiral Genus 28 map C28.5*# of type {18,9} Chiral Group <162,7> Number of orientably-regular maps = 2 Genus 25 map R25.24 of type {6,27} Reflexible Genus 25 map R25.24* of type {27,6} Reflexible Group <162,8> Number of orientably-regular maps = 2 Genus 37 map R37.50 of type {27,54} Reflexible Genus 37 map R37.50* of type {54,27} Reflexible Group <162,9> Number of orientably-regular maps = 4 Genus 25 map C25.3 of type {6,27} Chiral Genus 25 map C25.3# of type {6,27} Chiral Genus 25 map C25.3* of type {27,6} Chiral Genus 25 map C25.3*# of type {27,6} Chiral Group <162,10> Number of orientably-regular maps = 2 Genus 19 map R19.17 of type {6,9} Reflexible Genus 19 map R19.17* of type {9,6} Reflexible Group <162,11> Number of orientably-regular maps = 2 Genus 19 map R19.15 of type {6,9} Reflexible Genus 19 map R19.15* of type {9,6} Reflexible Group <162,12> Number of orientably-regular maps = 2 Genus 28 map R28.27 of type {9,18} Reflexible Genus 28 map R28.27* of type {18,9} Reflexible Group <162,13> Number of orientably-regular maps = 2 Genus 19 map R19.16 of type {6,9} Reflexible Genus 19 map R19.16* of type {9,6} Reflexible Group <162,14> Number of orientably-regular maps = 2 Genus 10 map R10.4 of type {3,18} Reflexible Genus 10 map R10.4* of type {18,3} Reflexible Group <162,15> Number of orientably-regular maps = 2 Genus 1 map R1.8 of type {3,6} Reflexible Genus 1 map R1.8* of type {6,3} Reflexible ............................................................................... Groups of order 164 Total = 5 Group <164,2> Number of orientably-regular maps = 1 Genus 41 map R41.72 of type {164,164} Reflexible Self-dual Group <164,3> Number of orientably-regular maps = 2 Genus 1 map C1.26 of type {4,4} Chiral Self-dual Genus 1 map C1.26# of type {4,4} Chiral Self-dual Group <164,4> Number of orientably-regular maps = 2 Genus 0 map R0.81 of type {2,82} Reflexible Genus 0 map R0.81* of type {82,2} Reflexible Group <164,5> Number of orientably-regular maps = 1 Genus 40 map R40.23 of type {82,82} Reflexible Self-dual ............................................................................... Groups of order 166 Total = 2 Group <166,1> Number of orientably-regular maps = 2 Genus 0 map R0.82 of type {2,83} Reflexible Genus 0 map R0.82* of type {83,2} Reflexible Group <166,2> Number of orientably-regular maps = 2 Genus 41 map R41.70 of type {83,166} Reflexible Genus 41 map R41.70* of type {166,83} Reflexible ............................................................................... Groups of order 168 Total = 57 Group <168,6> Number of orientably-regular maps = 1 Genus 42 map R42.15 of type {168,168} Reflexible Self-dual Group <168,8> Number of orientably-regular maps = 4 Genus 29 map C29.3 of type {12,12} Chiral Non-SD Non-MSD Genus 29 map C29.3# of type {12,12} Chiral Non-SD Non-MSD Genus 29 map C29.3* of type {12,12} Chiral Non-SD Non-MSD Genus 29 map C29.3*# of type {12,12} Chiral Non-SD Non-MSD Group <168,9> Number of orientably-regular maps = 4 Genus 22 map C22.5 of type {6,12} Chiral Genus 22 map C22.5# of type {6,12} Chiral Genus 22 map C22.5* of type {12,6} Chiral Genus 22 map C22.5*# of type {12,6} Chiral Group <168,11> Number of orientably-regular maps = 4 Genus 22 map C22.4 of type {6,12} Chiral Genus 22 map C22.4# of type {6,12} Chiral Genus 22 map C22.4* of type {12,6} Chiral Genus 22 map C22.4*# of type {12,6} Chiral Group <168,14> Number of orientably-regular maps = 2 Genus 33 map R33.75 of type {12,28} Reflexible Genus 33 map R33.75* of type {28,12} Reflexible Group <168,16> Number of orientably-regular maps = 2 Genus 26 map R26.7 of type {6,28} Reflexible Genus 26 map R26.7* of type {28,6} Reflexible Group <168,17> Number of orientably-regular maps = 2 Genus 30 map R30.6 of type {12,14} Reflexible Genus 30 map R30.6* of type {14,12} Reflexible Group <168,25> Number of orientably-regular maps = 2 Genus 35 map R35.11 of type {12,84} Reflexible Genus 35 map R35.11* of type {84,12} Reflexible Group <168,26> Number of orientably-regular maps = 2 Genus 28 map R28.24 of type {6,84} Reflexible Genus 28 map R28.24* of type {84,6} Reflexible Group <168,28> Number of orientably-regular maps = 2 Genus 34 map R34.14 of type {12,42} Reflexible Genus 34 map R34.14* of type {42,12} Reflexible Group <168,30> Number of orientably-regular maps = 2 Genus 39 map R39.16 of type {28,84} Reflexible Genus 39 map R39.16* of type {84,28} Reflexible Group <168,31> Number of orientably-regular maps = 2 Genus 36 map R36.21 of type {14,84} Reflexible Genus 36 map R36.21* of type {84,14} Reflexible Group <168,33> Number of orientably-regular maps = 2 Genus 38 map R38.9 of type {28,42} Reflexible Genus 38 map R38.9* of type {42,28} Reflexible Group <168,35> Number of orientably-regular maps = 2 Genus 21 map R21.13 of type {4,84} Reflexible Genus 21 map R21.13* of type {84,4} Reflexible Group <168,36> Number of orientably-regular maps = 2 Genus 0 map R0.83 of type {2,84} Reflexible Genus 0 map R0.83* of type {84,2} Reflexible Group <168,38> Number of orientably-regular maps = 2 Genus 20 map R20.1 of type {4,42} Reflexible Genus 20 map R20.1* of type {42,4} Reflexible Group <168,39> Number of orientably-regular maps = 1 Genus 41 map R41.71 of type {84,84} Reflexible Self-dual Group <168,40> Number of orientably-regular maps = 2 Genus 40 map R40.21 of type {42,84} Reflexible Genus 40 map R40.21* of type {84,42} Reflexible Group <168,42> Number of orientably-regular maps = 5 Genus 3 map R3.1 of type {3,7} Reflexible Genus 3 map R3.1* of type {7,3} Reflexible Genus 10 map R10.9 of type {4,7} Reflexible Genus 10 map R10.9* of type {7,4} Reflexible Genus 19 map R19.23 of type {7,7} Reflexible Self-dual Group <168,44> Number of orientably-regular maps = 2 Genus 35 map C35.8 of type {21,21} Chiral Mirror-self-dual Genus 35 map C35.8# of type {21,21} Chiral Mirror-self-dual Group <168,45> Number of orientably-regular maps = 2 Genus 36 map R36.23 of type {21,28} Reflexible Genus 36 map R36.23* of type {28,21} Reflexible Group <168,46> Number of orientably-regular maps = 2 Genus 18 map R18.1 of type {4,21} Reflexible Genus 18 map R18.1* of type {21,4} Reflexible Group <168,48> Number of orientably-regular maps = 2 Genus 25 map R25.23 of type {6,21} Reflexible Genus 25 map R25.23* of type {21,6} Reflexible Group <168,49> Number of orientably-regular maps = 4 Genus 1 map C1.5 of type {3,6} Chiral Genus 1 map C1.5# of type {3,6} Chiral Genus 1 map C1.5* of type {6,3} Chiral Genus 1 map C1.5*# of type {6,3} Chiral Group <168,52> Number of orientably-regular maps = 3 Genus 37 map R37.49 of type {21,42} Reflexible Genus 37 map R37.49* of type {42,21} Reflexible Genus 39 map R39.17 of type {42,42} Reflexible Self-dual ............................................................................... Groups of order 170 Total = 4 Group <170,1> Number of orientably-regular maps = 2 Genus 40 map R40.20 of type {34,85} Reflexible Genus 40 map R40.20* of type {85,34} Reflexible Group <170,2> Number of orientably-regular maps = 2 Genus 34 map R34.13 of type {10,85} Reflexible Genus 34 map R34.13* of type {85,10} Reflexible Group <170,3> Number of orientably-regular maps = 2 Genus 0 map R0.84 of type {2,85} Reflexible Genus 0 map R0.84* of type {85,2} Reflexible Group <170,4> Number of orientably-regular maps = 2 Genus 42 map R42.13 of type {85,170} Reflexible Genus 42 map R42.13* of type {170,85} Reflexible ............................................................................... Groups of order 172 Total = 4 Group <172,2> Number of orientably-regular maps = 1 Genus 43 map R43.27 of type {172,172} Reflexible Self-dual Group <172,3> Number of orientably-regular maps = 2 Genus 0 map R0.85 of type {2,86} Reflexible Genus 0 map R0.85* of type {86,2} Reflexible Group <172,4> Number of orientably-regular maps = 1 Genus 42 map R42.14 of type {86,86} Reflexible Self-dual ............................................................................... Groups of order 174 Total = 4 Group <174,1> Number of orientably-regular maps = 2 Genus 42 map R42.12 of type {58,87} Reflexible Genus 42 map R42.12* of type {87,58} Reflexible Group <174,2> Number of orientably-regular maps = 2 Genus 29 map R29.15 of type {6,87} Reflexible Genus 29 map R29.15* of type {87,6} Reflexible Group <174,3> Number of orientably-regular maps = 2 Genus 0 map R0.86 of type {2,87} Reflexible Genus 0 map R0.86* of type {87,2} Reflexible Group <174,4> Number of orientably-regular maps = 2 Genus 43 map R43.24 of type {87,174} Reflexible Genus 43 map R43.24* of type {174,87} Reflexible ............................................................................... Groups of order 176 Total = 42 Group <176,2> Number of orientably-regular maps = 1 Genus 44 map R44.12 of type {176,176} Reflexible Self-dual Group <176,3> Number of orientably-regular maps = 2 Genus 33 map R33.64 of type {8,88} Reflexible Genus 33 map R33.64* of type {88,8} Reflexible Group <176,4> Number of orientably-regular maps = 2 Genus 33 map R33.65 of type {8,88} Reflexible Genus 33 map R33.65* of type {88,8} Reflexible Group <176,5> Number of orientably-regular maps = 2 Genus 22 map R22.6 of type {4,88} Reflexible Genus 22 map R22.6* of type {88,4} Reflexible Group <176,6> Number of orientably-regular maps = 2 Genus 0 map R0.87 of type {2,88} Reflexible Genus 0 map R0.87* of type {88,2} Reflexible Group <176,13> Number of orientably-regular maps = 2 Genus 21 map R21.12 of type {4,44} Reflexible Genus 21 map R21.12* of type {44,4} Reflexible Group <176,14> Number of orientably-regular maps = 2 Genus 30 map R30.5 of type {8,22} Reflexible Genus 30 map R30.5* of type {22,8} Reflexible Group <176,16> Number of orientably-regular maps = 2 Genus 32 map R32.5 of type {8,44} Reflexible Genus 32 map R32.5* of type {44,8} Reflexible Group <176,20> Number of orientably-regular maps = 1 Genus 41 map R41.69 of type {44,44} Reflexible Self-dual Group <176,22> Number of orientably-regular maps = 1 Genus 43 map R43.26 of type {88,88} Reflexible Self-dual Group <176,23> Number of orientably-regular maps = 1 Genus 43 map R43.25 of type {88,88} Reflexible Self-dual Group <176,24> Number of orientably-regular maps = 2 Genus 40 map R40.17 of type {22,88} Reflexible Genus 40 map R40.17* of type {88,22} Reflexible Group <176,25> Number of orientably-regular maps = 2 Genus 42 map R42.10 of type {44,88} Reflexible Genus 42 map R42.10* of type {88,44} Reflexible ............................................................................... Groups of order 178 Total = 2 Group <178,1> Number of orientably-regular maps = 2 Genus 0 map R0.88 of type {2,89} Reflexible Genus 0 map R0.88* of type {89,2} Reflexible Group <178,2> Number of orientably-regular maps = 2 Genus 44 map R44.10 of type {89,178} Reflexible Genus 44 map R44.10* of type {178,89} Reflexible ............................................................................... Groups of order 180 Total = 37 Group <180,4> Number of orientably-regular maps = 1 Genus 45 map R45.44 of type {180,180} Reflexible Self-dual Group <180,5> Number of orientably-regular maps = 2 Genus 41 map C41.26 of type {36,36} Chiral Self-dual Genus 41 map C41.26# of type {36,36} Chiral Self-dual Group <180,7> Number of orientably-regular maps = 2 Genus 32 map R32.6 of type {10,18} Reflexible Genus 32 map R32.6* of type {18,10} Reflexible Group <180,8> Number of orientably-regular maps = 1 Genus 42 map R42.11 of type {45,45} Reflexible Self-dual Group <180,9> Number of orientably-regular maps = 2 Genus 40 map R40.16 of type {18,90} Reflexible Genus 40 map R40.16* of type {90,18} Reflexible Group <180,10> Number of orientably-regular maps = 2 Genus 36 map R36.18 of type {10,90} Reflexible Genus 36 map R36.18* of type {90,10} Reflexible Group <180,11> Number of orientably-regular maps = 2 Genus 0 map R0.89 of type {2,90} Reflexible Genus 0 map R0.89* of type {90,2} Reflexible Group <180,12> Number of orientably-regular maps = 1 Genus 44 map R44.11 of type {90,90} Reflexible Self-dual Group <180,19> Number of orientably-regular maps = 3 Genus 10 map R10.3 of type {3,15} Reflexible Genus 10 map R10.3* of type {15,3} Reflexible Genus 34 map R34.15 of type {15,15} Reflexible Self-dual Group <180,23> Number of orientably-regular maps = 1 Genus 37 map R37.48 of type {20,20} Reflexible Self-dual Group <180,25> Number of orientably-regular maps = 2 Genus 1 map C1.27 of type {4,4} Chiral Self-dual Genus 1 map C1.27# of type {4,4} Chiral Self-dual Group <180,26> Number of orientably-regular maps = 2 Genus 28 map R28.21 of type {6,30} Reflexible Genus 28 map R28.21* of type {30,6} Reflexible Group <180,28> Number of orientably-regular maps = 1 Genus 40 map R40.18 of type {30,30} Reflexible Self-dual Group <180,29> Number of orientably-regular maps = 2 Genus 28 map R28.23 of type {6,30} Reflexible Genus 28 map R28.23* of type {30,6} Reflexible Group <180,33> Number of orientably-regular maps = 2 Genus 40 map R40.19 of type {30,30} Reflexible Non-self-dual Genus 40 map R40.19* of type {30,30} Reflexible Non-self-dual Group <180,34> Number of orientably-regular maps = 2 Genus 28 map R28.22 of type {6,30} Reflexible Genus 28 map R28.22* of type {30,6} Reflexible ............................................................................... Groups of order 182 Total = 4 Group <182,1> Number of orientably-regular maps = 2 Genus 42 map R42.9 of type {26,91} Reflexible Genus 42 map R42.9* of type {91,26} Reflexible Group <182,2> Number of orientably-regular maps = 2 Genus 39 map R39.13 of type {14,91} Reflexible Genus 39 map R39.13* of type {91,14} Reflexible Group <182,3> Number of orientably-regular maps = 2 Genus 0 map R0.90 of type {2,91} Reflexible Genus 0 map R0.90* of type {91,2} Reflexible Group <182,4> Number of orientably-regular maps = 2 Genus 45 map R45.42 of type {91,182} Reflexible Genus 45 map R45.42* of type {182,91} Reflexible ............................................................................... Groups of order 184 Total = 12 Group <184,2> Number of orientably-regular maps = 1 Genus 46 map R46.37 of type {184,184} Reflexible Self-dual Group <184,4> Number of orientably-regular maps = 2 Genus 23 map R23.3 of type {4,92} Reflexible Genus 23 map R23.3* of type {92,4} Reflexible Group <184,5> Number of orientably-regular maps = 2 Genus 0 map R0.91 of type {2,92} Reflexible Genus 0 map R0.91* of type {92,2} Reflexible Group <184,7> Number of orientably-regular maps = 2 Genus 22 map R22.5 of type {4,46} Reflexible Genus 22 map R22.5* of type {46,4} Reflexible Group <184,8> Number of orientably-regular maps = 1 Genus 45 map R45.43 of type {92,92} Reflexible Self-dual Group <184,9> Number of orientably-regular maps = 2 Genus 44 map R44.9 of type {46,92} Reflexible Genus 44 map R44.9* of type {92,46} Reflexible ............................................................................... Groups of order 186 Total = 6 Group <186,1> Number of orientably-regular maps = 4 Genus 1 map C1.6 of type {3,6} Chiral Genus 1 map C1.6# of type {3,6} Chiral Genus 1 map C1.6* of type {6,3} Chiral Genus 1 map C1.6*# of type {6,3} Chiral Group <186,3> Number of orientably-regular maps = 2 Genus 45 map R45.41 of type {62,93} Reflexible Genus 45 map R45.41* of type {93,62} Reflexible Group <186,4> Number of orientably-regular maps = 2 Genus 31 map R31.14 of type {6,93} Reflexible Genus 31 map R31.14* of type {93,6} Reflexible Group <186,5> Number of orientably-regular maps = 2 Genus 0 map R0.92 of type {2,93} Reflexible Genus 0 map R0.92* of type {93,2} Reflexible Group <186,6> Number of orientably-regular maps = 2 Genus 46 map R46.35 of type {93,186} Reflexible Genus 46 map R46.35* of type {186,93} Reflexible ............................................................................... Groups of order 188 Total = 4 Group <188,2> Number of orientably-regular maps = 1 Genus 47 map R47.13 of type {188,188} Reflexible Self-dual Group <188,3> Number of orientably-regular maps = 2 Genus 0 map R0.93 of type {2,94} Reflexible Genus 0 map R0.93* of type {94,2} Reflexible Group <188,4> Number of orientably-regular maps = 1 Genus 46 map R46.36 of type {94,94} Reflexible Self-dual ............................................................................... Groups of order 190 Total = 4 Group <190,1> Number of orientably-regular maps = 2 Genus 45 map R45.34 of type {38,95} Reflexible Genus 45 map R45.34* of type {95,38} Reflexible Group <190,2> Number of orientably-regular maps = 2 Genus 38 map R38.7 of type {10,95} Reflexible Genus 38 map R38.7* of type {95,10} Reflexible Group <190,3> Number of orientably-regular maps = 2 Genus 0 map R0.94 of type {2,95} Reflexible Genus 0 map R0.94* of type {95,2} Reflexible Group <190,4> Number of orientably-regular maps = 2 Genus 47 map R47.10 of type {95,190} Reflexible Genus 47 map R47.10* of type {190,95} Reflexible ............................................................................... Groups of order 192 Total = 1543 Group <192,2> Number of orientably-regular maps = 1 Genus 48 map R48.17 of type {192,192} Reflexible Self-dual Group <192,5> Number of orientably-regular maps = 2 Genus 45 map R45.33 of type {32,96} Reflexible Genus 45 map R45.33* of type {96,32} Reflexible Group <192,6> Number of orientably-regular maps = 2 Genus 45 map R45.32 of type {32,96} Reflexible Genus 45 map R45.32* of type {96,32} Reflexible Group <192,7> Number of orientably-regular maps = 2 Genus 0 map R0.95 of type {2,96} Reflexible Genus 0 map R0.95* of type {96,2} Reflexible Group <192,8> Number of orientably-regular maps = 2 Genus 24 map R24.3 of type {4,96} Reflexible Genus 24 map R24.3* of type {96,4} Reflexible Group <192,10> Number of orientably-regular maps = 2 Genus 29 map R29.22 of type {8,12} Reflexible Genus 29 map R29.22* of type {12,8} Reflexible Group <192,18> Number of orientably-regular maps = 2 Genus 33 map R33.59 of type {8,24} Reflexible Genus 33 map R33.59* of type {24,8} Reflexible Group <192,23> Number of orientably-regular maps = 2 Genus 33 map R33.60 of type {8,24} Reflexible Genus 33 map R33.60* of type {24,8} Reflexible Group <192,27> Number of orientably-regular maps = 2 Genus 33 map R33.61 of type {8,24} Reflexible Genus 33 map R33.61* of type {24,8} Reflexible Group <192,29> Number of orientably-regular maps = 2 Genus 21 map R21.10 of type {4,24} Reflexible Genus 21 map R21.10* of type {24,4} Reflexible Group <192,30> Number of orientably-regular maps = 2 Genus 29 map R29.23 of type {8,12} Reflexible Genus 29 map R29.23* of type {12,8} Reflexible Group <192,33> Number of orientably-regular maps = 2 Genus 17 map R17.12 of type {4,12} Reflexible Genus 17 map R17.12* of type {12,4} Reflexible Group <192,34> Number of orientably-regular maps = 2 Genus 21 map R21.11 of type {4,24} Reflexible Genus 21 map R21.11* of type {24,4} Reflexible Group <192,36> Number of orientably-regular maps = 2 Genus 33 map R33.62 of type {8,24} Reflexible Genus 33 map R33.62* of type {24,8} Reflexible Group <192,42> Number of orientably-regular maps = 2 Genus 33 map R33.63 of type {8,24} Reflexible Genus 33 map R33.63* of type {24,8} Reflexible Group <192,44> Number of orientably-regular maps = 2 Genus 33 map R33.58 of type {8,24} Reflexible Genus 33 map R33.58* of type {24,8} Reflexible Group <192,47> Number of orientably-regular maps = 2 Genus 35 map R35.10 of type {12,16} Reflexible Genus 35 map R35.10* of type {16,12} Reflexible Group <192,50> Number of orientably-regular maps = 2 Genus 35 map R35.9 of type {12,16} Reflexible Genus 35 map R35.9* of type {16,12} Reflexible Group <192,54> Number of orientably-regular maps = 2 Genus 39 map R39.15 of type {16,24} Reflexible Genus 39 map R39.15* of type {24,16} Reflexible Group <192,56> Number of orientably-regular maps = 2 Genus 39 map R39.14 of type {16,24} Reflexible Genus 39 map R39.14* of type {24,16} Reflexible Group <192,66> Number of orientably-regular maps = 2 Genus 41 map R41.57 of type {16,48} Reflexible Genus 41 map R41.57* of type {48,16} Reflexible Group <192,67> Number of orientably-regular maps = 2 Genus 41 map R41.55 of type {16,48} Reflexible Genus 41 map R41.55* of type {48,16} Reflexible Group <192,68> Number of orientably-regular maps = 2 Genus 23 map R23.1 of type {4,48} Reflexible Genus 23 map R23.1* of type {48,4} Reflexible Group <192,69> Number of orientably-regular maps = 2 Genus 35 map R35.8 of type {8,48} Reflexible Genus 35 map R35.8* of type {48,8} Reflexible Group <192,73> Number of orientably-regular maps = 2 Genus 41 map R41.54 of type {16,48} Reflexible Genus 41 map R41.54* of type {48,16} Reflexible Group <192,74> Number of orientably-regular maps = 2 Genus 41 map R41.56 of type {16,48} Reflexible Genus 41 map R41.56* of type {48,16} Reflexible Group <192,75> Number of orientably-regular maps = 2 Genus 35 map R35.7 of type {8,48} Reflexible Genus 35 map R35.7* of type {48,8} Reflexible Group <192,77> Number of orientably-regular maps = 2 Genus 23 map R23.2 of type {4,48} Reflexible Genus 23 map R23.2* of type {48,4} Reflexible Group <192,78> Number of orientably-regular maps = 2 Genus 30 map R30.4 of type {6,32} Reflexible Genus 30 map R30.4* of type {32,6} Reflexible Group <192,80> Number of orientably-regular maps = 2 Genus 38 map R38.8 of type {12,32} Reflexible Genus 38 map R38.8* of type {32,12} Reflexible Group <192,129> Number of orientably-regular maps = 1 Genus 41 map R41.66 of type {24,24} Reflexible Self-dual Group <192,131> Number of orientably-regular maps = 2 Genus 41 map R41.65 of type {24,24} Reflexible Non-self-dual Genus 41 map R41.65* of type {24,24} Reflexible Non-self-dual Group <192,133> Number of orientably-regular maps = 2 Genus 37 map R37.46 of type {12,24} Reflexible Genus 37 map R37.46* of type {24,12} Reflexible Group <192,135> Number of orientably-regular maps = 1 Genus 41 map R41.68 of type {24,24} Reflexible Self-dual Group <192,137> Number of orientably-regular maps = 1 Genus 41 map R41.64 of type {24,24} Reflexible Self-dual Group <192,154> Number of orientably-regular maps = 1 Genus 45 map R45.38 of type {48,48} Reflexible Self-dual Group <192,155> Number of orientably-regular maps = 1 Genus 45 map R45.40 of type {48,48} Reflexible Self-dual Group <192,156> Number of orientably-regular maps = 2 Genus 45 map R45.39 of type {48,48} Reflexible Non-self-dual Genus 45 map R45.39* of type {48,48} Reflexible Non-self-dual Group <192,157> Number of orientably-regular maps = 2 Genus 37 map R37.47 of type {12,24} Reflexible Genus 37 map R37.47* of type {24,12} Reflexible Group <192,159> Number of orientably-regular maps = 1 Genus 33 map R33.74 of type {12,12} Reflexible Self-dual Group <192,161> Number of orientably-regular maps = 1 Genus 41 map R41.67 of type {24,24} Reflexible Self-dual Group <192,163> Number of orientably-regular maps = 2 Genus 39 map R39.11 of type {12,48} Reflexible Genus 39 map R39.11* of type {48,12} Reflexible Group <192,165> Number of orientably-regular maps = 2 Genus 43 map R43.23 of type {24,48} Reflexible Genus 43 map R43.23* of type {48,24} Reflexible Group <192,166> Number of orientably-regular maps = 2 Genus 39 map R39.12 of type {12,48} Reflexible Genus 39 map R39.12* of type {48,12} Reflexible Group <192,167> Number of orientably-regular maps = 2 Genus 43 map R43.22 of type {24,48} Reflexible Genus 43 map R43.22* of type {48,24} Reflexible Group <192,175> Number of orientably-regular maps = 1 Genus 47 map R47.12 of type {96,96} Reflexible Self-dual Group <192,176> Number of orientably-regular maps = 1 Genus 47 map R47.11 of type {96,96} Reflexible Self-dual Group <192,177> Number of orientably-regular maps = 2 Genus 32 map R32.4 of type {6,96} Reflexible Genus 32 map R32.4* of type {96,6} Reflexible Group <192,178> Number of orientably-regular maps = 2 Genus 40 map R40.15 of type {12,96} Reflexible Genus 40 map R40.15* of type {96,12} Reflexible Group <192,181> Number of orientably-regular maps = 4 Genus 5 map R5.1 of type {3,8} Reflexible Genus 5 map R5.1* of type {8,3} Reflexible Genus 21 map R21.19 of type {6,8} Reflexible Genus 21 map R21.19* of type {8,6} Reflexible Group <192,191> Number of orientably-regular maps = 2 Genus 33 map R33.68 of type {12,12} Reflexible Self-dual Genus 33 map R33.69 of type {12,12} Reflexible Self-dual Group <192,194> Number of orientably-regular maps = 4 Genus 9 map R9.1 of type {3,12} Reflexible Genus 9 map R9.1* of type {12,3} Reflexible Genus 25 map R25.22 of type {6,12} Reflexible Genus 25 map R25.22* of type {12,6} Reflexible Group <192,201> Number of orientably-regular maps = 2 Genus 17 map R17.21 of type {6,6} Reflexible Self-dual Genus 17 map R17.22 of type {6,6} Reflexible Self-dual Group <192,202> Number of orientably-regular maps = 2 Genus 33 map R33.66 of type {12,12} Reflexible Self-dual Genus 33 map R33.67 of type {12,12} Reflexible Self-dual Group <192,203> Number of orientably-regular maps = 2 Genus 45 map R45.36 of type {48,48} Reflexible Self-dual Genus 45 map R45.37 of type {48,48} Reflexible Self-dual Group <192,204> Number of orientably-regular maps = 2 Genus 45 map R45.35 of type {48,48} Reflexible Non-self-dual Genus 45 map R45.35* of type {48,48} Reflexible Non-self-dual Group <192,944> Number of orientably-regular maps = 2 Genus 21 map R21.16 of type {6,8} Reflexible Genus 21 map R21.16* of type {8,6} Reflexible Group <192,951> Number of orientably-regular maps = 2 Genus 29 map R29.17 of type {8,12} Reflexible Genus 29 map R29.17* of type {12,8} Reflexible Group <192,952> Number of orientably-regular maps = 2 Genus 29 map R29.16 of type {8,12} Reflexible Genus 29 map R29.16* of type {12,8} Reflexible Group <192,953> Number of orientably-regular maps = 2 Genus 29 map R29.19 of type {8,12} Reflexible Genus 29 map R29.19* of type {12,8} Reflexible Group <192,954> Number of orientably-regular maps = 2 Genus 29 map R29.18 of type {8,12} Reflexible Genus 29 map R29.18* of type {12,8} Reflexible Group <192,955> Number of orientably-regular maps = 2 Genus 9 map R9.4 of type {4,6} Reflexible Genus 9 map R9.4* of type {6,4} Reflexible Group <192,956> Number of orientably-regular maps = 2 Genus 21 map R21.15 of type {6,8} Reflexible Genus 21 map R21.15* of type {8,6} Reflexible Group <192,958> Number of orientably-regular maps = 2 Genus 33 map R33.54 of type {8,24} Reflexible Genus 33 map R33.54* of type {24,8} Reflexible Group <192,959> Number of orientably-regular maps = 2 Genus 33 map R33.55 of type {8,24} Reflexible Genus 33 map R33.55* of type {24,8} Reflexible Group <192,960> Number of orientably-regular maps = 2 Genus 21 map R21.6 of type {4,24} Reflexible Genus 21 map R21.6* of type {24,4} Reflexible Group <192,961> Number of orientably-regular maps = 2 Genus 21 map R21.7 of type {4,24} Reflexible Genus 21 map R21.7* of type {24,4} Reflexible Group <192,963> Number of orientably-regular maps = 2 Genus 21 map R21.8 of type {4,24} Reflexible Genus 21 map R21.8* of type {24,4} Reflexible Group <192,964> Number of orientably-regular maps = 2 Genus 21 map R21.9 of type {4,24} Reflexible Genus 21 map R21.9* of type {24,4} Reflexible Group <192,965> Number of orientably-regular maps = 2 Genus 33 map R33.56 of type {8,24} Reflexible Genus 33 map R33.56* of type {24,8} Reflexible Group <192,966> Number of orientably-regular maps = 2 Genus 33 map R33.57 of type {8,24} Reflexible Genus 33 map R33.57* of type {24,8} Reflexible Group <192,972> Number of orientably-regular maps = 2 Genus 17 map R17.10 of type {4,12} Reflexible Genus 17 map R17.10* of type {12,4} Reflexible Group <192,974> Number of orientably-regular maps = 2 Genus 21 map R21.18 of type {6,8} Reflexible Genus 21 map R21.18* of type {8,6} Reflexible Group <192,976> Number of orientably-regular maps = 2 Genus 29 map R29.21 of type {8,12} Reflexible Genus 29 map R29.21* of type {12,8} Reflexible Group <192,980> Number of orientably-regular maps = 2 Genus 21 map R21.17 of type {6,8} Reflexible Genus 21 map R21.17* of type {8,6} Reflexible Group <192,986> Number of orientably-regular maps = 2 Genus 29 map R29.20 of type {8,12} Reflexible Genus 29 map R29.20* of type {12,8} Reflexible Group <192,988> Number of orientably-regular maps = 2 Genus 17 map R17.11 of type {4,12} Reflexible Genus 17 map R17.11* of type {12,4} Reflexible Group <192,990> Number of orientably-regular maps = 2 Genus 9 map R9.3 of type {4,6} Reflexible Genus 9 map R9.3* of type {6,4} Reflexible Group <192,994> Number of orientably-regular maps = 1 Genus 33 map R33.71 of type {12,12} Reflexible Self-dual Group <192,997> Number of orientably-regular maps = 1 Genus 33 map R33.70 of type {12,12} Reflexible Self-dual Group <192,999> Number of orientably-regular maps = 1 Genus 33 map R33.72 of type {12,12} Reflexible Self-dual Group <192,1000> Number of orientably-regular maps = 1 Genus 17 map R17.20 of type {6,6} Reflexible Self-dual Group <192,1002> Number of orientably-regular maps = 2 Genus 17 map R17.19 of type {6,6} Reflexible Non-self-dual Genus 17 map R17.19* of type {6,6} Reflexible Non-self-dual Group <192,1003> Number of orientably-regular maps = 2 Genus 25 map R25.21 of type {6,12} Reflexible Genus 25 map R25.21* of type {12,6} Reflexible Group <192,1005> Number of orientably-regular maps = 2 Genus 33 map R33.73 of type {12,12} Reflexible Non-self-dual Genus 33 map R33.73* of type {12,12} Reflexible Non-self-dual Group <192,1008> Number of orientably-regular maps = 2 Genus 17 map C17.3 of type {6,6} Chiral Self-dual Genus 17 map C17.3# of type {6,6} Chiral Self-dual Group <192,1010> Number of orientably-regular maps = 1 Genus 41 map R41.60 of type {24,24} Reflexible Self-dual Group <192,1011> Number of orientably-regular maps = 1 Genus 41 map R41.61 of type {24,24} Reflexible Self-dual Group <192,1012> Number of orientably-regular maps = 1 Genus 41 map R41.62 of type {24,24} Reflexible Self-dual Group <192,1013> Number of orientably-regular maps = 1 Genus 41 map R41.63 of type {24,24} Reflexible Self-dual Group <192,1014> Number of orientably-regular maps = 2 Genus 29 map R29.13 of type {6,24} Reflexible Genus 29 map R29.13* of type {24,6} Reflexible Group <192,1015> Number of orientably-regular maps = 2 Genus 37 map R37.44 of type {12,24} Reflexible Genus 37 map R37.44* of type {24,12} Reflexible Group <192,1017> Number of orientably-regular maps = 2 Genus 37 map R37.45 of type {12,24} Reflexible Genus 37 map R37.45* of type {24,12} Reflexible Group <192,1018> Number of orientably-regular maps = 2 Genus 29 map R29.14 of type {6,24} Reflexible Genus 29 map R29.14* of type {24,6} Reflexible ............................................................................... Groups of order 194 Total = 2 Group <194,1> Number of orientably-regular maps = 2 Genus 0 map R0.96 of type {2,97} Reflexible Genus 0 map R0.96* of type {97,2} Reflexible Group <194,2> Number of orientably-regular maps = 2 Genus 48 map R48.15 of type {97,194} Reflexible Genus 48 map R48.15* of type {194,97} Reflexible ............................................................................... Groups of order 196 Total = 12 Group <196,2> Number of orientably-regular maps = 1 Genus 49 map R49.107 of type {196,196} Reflexible Self-dual Group <196,3> Number of orientably-regular maps = 2 Genus 0 map R0.97 of type {2,98} Reflexible Genus 0 map R0.97* of type {98,2} Reflexible Group <196,4> Number of orientably-regular maps = 1 Genus 48 map R48.16 of type {98,98} Reflexible Self-dual Group <196,8> Number of orientably-regular maps = 1 Genus 1 map R1.23 of type {4,4} Reflexible Self-dual Group <196,9> Number of orientably-regular maps = 1 Genus 36 map R36.19 of type {14,14} Reflexible Self-dual Group <196,10> Number of orientably-regular maps = 2 Genus 36 map R36.20 of type {14,14} Reflexible Non-self-dual Genus 36 map R36.20* of type {14,14} Reflexible Non-self-dual ............................................................................... Groups of order 198 Total = 10 Group <198,1> Number of orientably-regular maps = 2 Genus 45 map R45.31 of type {22,99} Reflexible Genus 45 map R45.31* of type {99,22} Reflexible Group <198,2> Number of orientably-regular maps = 2 Genus 44 map R44.8 of type {18,99} Reflexible Genus 44 map R44.8* of type {99,18} Reflexible Group <198,3> Number of orientably-regular maps = 2 Genus 0 map R0.98 of type {2,99} Reflexible Genus 0 map R0.98* of type {99,2} Reflexible Group <198,4> Number of orientably-regular maps = 2 Genus 49 map R49.105 of type {99,198} Reflexible Genus 49 map R49.105* of type {198,99} Reflexible Group <198,6> Number of orientably-regular maps = 2 Genus 46 map R46.34 of type {33,66} Reflexible Genus 46 map R46.34* of type {66,33} Reflexible Group <198,7> Number of orientably-regular maps = 2 Genus 31 map R31.13 of type {6,33} Reflexible Genus 31 map R31.13* of type {33,6} Reflexible ............................................................................... Groups of order 200 Total = 52 Group <200,2> Number of orientably-regular maps = 1 Genus 50 map R50.18 of type {200,200} Reflexible Self-dual Group <200,5> Number of orientably-regular maps = 2 Genus 25 map R25.17 of type {4,100} Reflexible Genus 25 map R25.17* of type {100,4} Reflexible Group <200,6> Number of orientably-regular maps = 2 Genus 0 map R0.99 of type {2,100} Reflexible Genus 0 map R0.99* of type {100,2} Reflexible Group <200,8> Number of orientably-regular maps = 2 Genus 24 map R24.2 of type {4,50} Reflexible Genus 24 map R24.2* of type {50,4} Reflexible Group <200,9> Number of orientably-regular maps = 1 Genus 49 map R49.106 of type {100,100} Reflexible Self-dual Group <200,10> Number of orientably-regular maps = 2 Genus 48 map R48.13 of type {50,100} Reflexible Genus 48 map R48.13* of type {100,50} Reflexible Group <200,12> Number of orientably-regular maps = 2 Genus 1 map C1.28 of type {4,4} Chiral Self-dual Genus 1 map C1.28# of type {4,4} Chiral Self-dual Group <200,23> Number of orientably-regular maps = 1 Genus 41 map R41.59 of type {20,20} Reflexible Self-dual Group <200,25> Number of orientably-regular maps = 2 Genus 36 map R36.16 of type {10,20} Reflexible Genus 36 map R36.16* of type {20,10} Reflexible Group <200,28> Number of orientably-regular maps = 2 Genus 41 map R41.58 of type {20,20} Reflexible Non-self-dual Genus 41 map R41.58* of type {20,20} Reflexible Non-self-dual Group <200,29> Number of orientably-regular maps = 2 Genus 36 map R36.15 of type {10,20} Reflexible Genus 36 map R36.15* of type {20,10} Reflexible Group <200,31> Number of orientably-regular maps = 2 Genus 36 map R36.17 of type {10,20} Reflexible Genus 36 map R36.17* of type {20,10} Reflexible Group <200,40> Number of orientably-regular maps = 2 Genus 26 map C26.1 of type {8,8} Chiral Mirror-self-dual Genus 26 map C26.1# of type {8,8} Chiral Mirror-self-dual Group <200,41> Number of orientably-regular maps = 4 Genus 21 map C21.5 of type {4,20} Chiral Genus 21 map C21.5# of type {4,20} Chiral Genus 21 map C21.5* of type {20,4} Chiral Genus 21 map C21.5*# of type {20,4} Chiral Group <200,43> Number of orientably-regular maps = 2 Genus 16 map R16.3 of type {4,10} Reflexible Genus 16 map R16.3* of type {10,4} Reflexible Group <200,45> Number of orientably-regular maps = 2 Genus 41 map C41.25 of type {20,20} Chiral Self-dual Genus 41 map C41.25# of type {20,20} Chiral Self-dual Group <200,48> Number of orientably-regular maps = 1 Genus 1 map R1.24 of type {4,4} Reflexible Self-dual ............................................................................... Groups of order 202 Total = 2 Group <202,1> Number of orientably-regular maps = 2 Genus 0 map R0.100 of type {2,101} Reflexible Genus 0 map R0.100* of type {101,2} Reflexible Group <202,2> Number of orientably-regular maps = 2 Genus 50 map R50.16 of type {101,202} Reflexible Genus 50 map R50.16* of type {202,101} Reflexible ............................................................................... Groups of order 204 Total = 12 Group <204,4> Number of orientably-regular maps = 1 Genus 51 map R51.35 of type {204,204} Reflexible Self-dual Group <204,5> Number of orientably-regular maps = 2 Genus 35 map C35.7 of type {12,12} Chiral Self-dual Genus 35 map C35.7# of type {12,12} Chiral Self-dual Group <204,7> Number of orientably-regular maps = 2 Genus 32 map R32.3 of type {6,34} Reflexible Genus 32 map R32.3* of type {34,6} Reflexible Group <204,8> Number of orientably-regular maps = 1 Genus 48 map R48.14 of type {51,51} Reflexible Self-dual Group <204,9> Number of orientably-regular maps = 2 Genus 34 map R34.10 of type {6,102} Reflexible Genus 34 map R34.10* of type {102,6} Reflexible Group <204,10> Number of orientably-regular maps = 2 Genus 48 map R48.12 of type {34,102} Reflexible Genus 48 map R48.12* of type {102,34} Reflexible Group <204,11> Number of orientably-regular maps = 2 Genus 0 map R0.101 of type {2,102} Reflexible Genus 0 map R0.101* of type {102,2} Reflexible Group <204,12> Number of orientably-regular maps = 1 Genus 50 map R50.17 of type {102,102} Reflexible Self-dual ............................................................................... Groups of order 206 Total = 2 Group <206,1> Number of orientably-regular maps = 2 Genus 0 map R0.102 of type {2,103} Reflexible Genus 0 map R0.102* of type {103,2} Reflexible Group <206,2> Number of orientably-regular maps = 2 Genus 51 map R51.32 of type {103,206} Reflexible Genus 51 map R51.32* of type {206,103} Reflexible ............................................................................... Groups of order 208 Total = 51 Group <208,2> Number of orientably-regular maps = 1 Genus 52 map R52.18 of type {208,208} Reflexible Self-dual Group <208,4> Number of orientably-regular maps = 2 Genus 39 map R39.8 of type {8,104} Reflexible Genus 39 map R39.8* of type {104,8} Reflexible Group <208,5> Number of orientably-regular maps = 2 Genus 39 map R39.9 of type {8,104} Reflexible Genus 39 map R39.9* of type {104,8} Reflexible Group <208,6> Number of orientably-regular maps = 2 Genus 26 map R26.4 of type {4,104} Reflexible Genus 26 map R26.4* of type {104,4} Reflexible Group <208,7> Number of orientably-regular maps = 2 Genus 0 map R0.103 of type {2,104} Reflexible Genus 0 map R0.103* of type {104,2} Reflexible Group <208,14> Number of orientably-regular maps = 2 Genus 25 map R25.16 of type {4,52} Reflexible Genus 25 map R25.16* of type {52,4} Reflexible Group <208,15> Number of orientably-regular maps = 2 Genus 36 map R36.14 of type {8,26} Reflexible Genus 36 map R36.14* of type {26,8} Reflexible Group <208,17> Number of orientably-regular maps = 2 Genus 38 map R38.6 of type {8,52} Reflexible Genus 38 map R38.6* of type {52,8} Reflexible Group <208,21> Number of orientably-regular maps = 1 Genus 49 map R49.104 of type {52,52} Reflexible Self-dual Group <208,23> Number of orientably-regular maps = 1 Genus 51 map R51.34 of type {104,104} Reflexible Self-dual Group <208,24> Number of orientably-regular maps = 1 Genus 51 map R51.33 of type {104,104} Reflexible Self-dual Group <208,25> Number of orientably-regular maps = 2 Genus 48 map R48.11 of type {26,104} Reflexible Genus 48 map R48.11* of type {104,26} Reflexible Group <208,26> Number of orientably-regular maps = 2 Genus 50 map R50.15 of type {52,104} Reflexible Genus 50 map R50.15* of type {104,52} Reflexible Group <208,28> Number of orientably-regular maps = 2 Genus 27 map C27.5 of type {8,8} Chiral Self-dual Genus 27 map C27.5# of type {8,8} Chiral Self-dual Group <208,29> Number of orientably-regular maps = 2 Genus 27 map C27.6 of type {8,8} Chiral Self-dual Genus 27 map C27.6# of type {8,8} Chiral Self-dual Group <208,34> Number of orientably-regular maps = 2 Genus 1 map C1.29 of type {4,4} Chiral Self-dual Genus 1 map C1.29# of type {4,4} Chiral Self-dual ............................................................................... Groups of order 210 Total = 12 Group <210,1> Number of orientably-regular maps = 4 Genus 43 map C43.10 of type {15,30} Chiral Genus 43 map C43.10# of type {15,30} Chiral Genus 43 map C43.10* of type {30,15} Chiral Genus 43 map C43.10*# of type {30,15} Chiral Group <210,3> Number of orientably-regular maps = 4 Genus 29 map C29.2 of type {6,15} Chiral Genus 29 map C29.2# of type {6,15} Chiral Genus 29 map C29.2* of type {15,6} Chiral Genus 29 map C29.2*# of type {15,6} Chiral Group <210,5> Number of orientably-regular maps = 2 Genus 49 map R49.102 of type {30,105} Reflexible Genus 49 map R49.102* of type {105,30} Reflexible Group <210,6> Number of orientably-regular maps = 2 Genus 50 map R50.14 of type {42,105} Reflexible Genus 50 map R50.14* of type {105,42} Reflexible Group <210,7> Number of orientably-regular maps = 2 Genus 35 map R35.6 of type {6,105} Reflexible Genus 35 map R35.6* of type {105,6} Reflexible Group <210,8> Number of orientably-regular maps = 2 Genus 51 map R51.31 of type {70,105} Reflexible Genus 51 map R51.31* of type {105,70} Reflexible Group <210,9> Number of orientably-regular maps = 2 Genus 42 map R42.7 of type {10,105} Reflexible Genus 42 map R42.7* of type {105,10} Reflexible Group <210,10> Number of orientably-regular maps = 2 Genus 45 map R45.29 of type {14,105} Reflexible Genus 45 map R45.29* of type {105,14} Reflexible Group <210,11> Number of orientably-regular maps = 2 Genus 0 map R0.104 of type {2,105} Reflexible Genus 0 map R0.104* of type {105,2} Reflexible Group <210,12> Number of orientably-regular maps = 2 Genus 52 map R52.16 of type {105,210} Reflexible Genus 52 map R52.16* of type {210,105} Reflexible ............................................................................... Groups of order 212 Total = 5 Group <212,2> Number of orientably-regular maps = 1 Genus 53 map R53.28 of type {212,212} Reflexible Self-dual Group <212,3> Number of orientably-regular maps = 2 Genus 1 map C1.30 of type {4,4} Chiral Self-dual Genus 1 map C1.30# of type {4,4} Chiral Self-dual Group <212,4> Number of orientably-regular maps = 2 Genus 0 map R0.105 of type {2,106} Reflexible Genus 0 map R0.105* of type {106,2} Reflexible Group <212,5> Number of orientably-regular maps = 1 Genus 52 map R52.17 of type {106,106} Reflexible Self-dual ............................................................................... Groups of order 214 Total = 2 Group <214,1> Number of orientably-regular maps = 2 Genus 0 map R0.106 of type {2,107} Reflexible Genus 0 map R0.106* of type {107,2} Reflexible Group <214,2> Number of orientably-regular maps = 2 Genus 53 map R53.26 of type {107,214} Reflexible Genus 53 map R53.26* of type {214,107} Reflexible ............................................................................... Groups of order 216 Total = 177 Group <216,2> Number of orientably-regular maps = 1 Genus 54 map R54.20 of type {216,216} Reflexible Self-dual Group <216,5> Number of orientably-regular maps = 2 Genus 27 map R27.4 of type {4,108} Reflexible Genus 27 map R27.4* of type {108,4} Reflexible Group <216,6> Number of orientably-regular maps = 2 Genus 0 map R0.107 of type {2,108} Reflexible Genus 0 map R0.107* of type {108,2} Reflexible Group <216,8> Number of orientably-regular maps = 2 Genus 26 map R26.3 of type {4,54} Reflexible Genus 26 map R26.3* of type {54,4} Reflexible Group <216,9> Number of orientably-regular maps = 1 Genus 53 map R53.27 of type {108,108} Reflexible Self-dual Group <216,10> Number of orientably-regular maps = 2 Genus 52 map R52.15 of type {54,108} Reflexible Genus 52 map R52.15* of type {108,54} Reflexible Group <216,21> Number of orientably-regular maps = 2 Genus 24 map R24.1 of type {4,27} Reflexible Genus 24 map R24.1* of type {27,4} Reflexible Group <216,22> Number of orientably-regular maps = 3 Genus 49 map R49.100 of type {27,54} Reflexible Genus 49 map R49.100* of type {54,27} Reflexible Genus 51 map R51.30 of type {54,54} Reflexible Self-dual Group <216,28> Number of orientably-regular maps = 2 Genus 43 map R43.20 of type {12,36} Reflexible Genus 43 map R43.20* of type {36,12} Reflexible Group <216,29> Number of orientably-regular maps = 2 Genus 34 map R34.8 of type {6,36} Reflexible Genus 34 map R34.8* of type {36,6} Reflexible Group <216,32> Number of orientably-regular maps = 2 Genus 40 map R40.14 of type {12,18} Reflexible Genus 40 map R40.14* of type {18,12} Reflexible Group <216,36> Number of orientably-regular maps = 1 Genus 37 map R37.43 of type {12,12} Reflexible Self-dual Group <216,37> Number of orientably-regular maps = 2 Genus 28 map R28.20 of type {6,12} Reflexible Genus 28 map R28.20* of type {12,6} Reflexible Group <216,45> Number of orientably-regular maps = 2 Genus 43 map R43.21 of type {12,36} Reflexible Genus 43 map R43.21* of type {36,12} Reflexible Group <216,46> Number of orientably-regular maps = 2 Genus 34 map R34.9 of type {6,36} Reflexible Genus 34 map R34.9* of type {36,6} Reflexible Group <216,47> Number of orientably-regular maps = 2 Genus 49 map R49.103 of type {36,36} Reflexible Non-self-dual Genus 49 map R49.103* of type {36,36} Reflexible Non-self-dual Group <216,48> Number of orientably-regular maps = 2 Genus 46 map R46.32 of type {18,36} Reflexible Genus 46 map R46.32* of type {36,18} Reflexible Group <216,50> Number of orientably-regular maps = 2 Genus 37 map R37.41 of type {12,12} Reflexible Non-self-dual Genus 37 map R37.41* of type {12,12} Reflexible Non-self-dual Group <216,51> Number of orientably-regular maps = 2 Genus 28 map R28.19 of type {6,12} Reflexible Genus 28 map R28.19* of type {12,6} Reflexible Group <216,53> Number of orientably-regular maps = 4 Genus 43 map C43.9 of type {12,36} Chiral Genus 43 map C43.9# of type {12,36} Chiral Genus 43 map C43.9* of type {36,12} Chiral Genus 43 map C43.9*# of type {36,12} Chiral Group <216,54> Number of orientably-regular maps = 4 Genus 34 map C34.1 of type {6,36} Chiral Genus 34 map C34.1# of type {6,36} Chiral Genus 34 map C34.1* of type {36,6} Chiral Genus 34 map C34.1*# of type {36,6} Chiral Group <216,57> Number of orientably-regular maps = 2 Genus 40 map R40.13 of type {12,18} Reflexible Genus 40 map R40.13* of type {18,12} Reflexible Group <216,58> Number of orientably-regular maps = 2 Genus 46 map R46.33 of type {18,36} Reflexible Genus 46 map R46.33* of type {36,18} Reflexible Group <216,60> Number of orientably-regular maps = 2 Genus 28 map R28.17 of type {6,12} Reflexible Genus 28 map R28.17* of type {12,6} Reflexible Group <216,62> Number of orientably-regular maps = 4 Genus 40 map C40.7 of type {12,18} Chiral Genus 40 map C40.7# of type {12,18} Chiral Genus 40 map C40.7* of type {18,12} Chiral Genus 40 map C40.7*# of type {18,12} Chiral Group <216,86> Number of orientably-regular maps = 2 Genus 28 map C28.4 of type {8,8} Chiral Self-dual Genus 28 map C28.4# of type {8,8} Chiral Self-dual Group <216,87> Number of orientably-regular maps = 6 Genus 10 map R10.7 of type {4,6} Reflexible Genus 10 map R10.7* of type {6,4} Reflexible Genus 28 map R28.15 of type {6,12} Reflexible Genus 28 map R28.15* of type {12,6} Reflexible Genus 28 map R28.16 of type {6,12} Reflexible Genus 28 map R28.16* of type {12,6} Reflexible Group <216,89> Number of orientably-regular maps = 2 Genus 40 map R40.11 of type {9,36} Reflexible Genus 40 map R40.11* of type {36,9} Reflexible Group <216,90> Number of orientably-regular maps = 4 Genus 34 map C34.2 of type {9,12} Chiral Genus 34 map C34.2# of type {9,12} Chiral Genus 34 map C34.2* of type {12,9} Chiral Genus 34 map C34.2*# of type {12,9} Chiral Group <216,91> Number of orientably-regular maps = 2 Genus 34 map R34.12 of type {9,12} Reflexible Genus 34 map R34.12* of type {12,9} Reflexible Group <216,92> Number of orientably-regular maps = 2 Genus 10 map R10.2 of type {3,12} Reflexible Genus 10 map R10.2* of type {12,3} Reflexible Group <216,96> Number of orientably-regular maps = 4 Genus 25 map C25.2 of type {6,9} Chiral Genus 25 map C25.2# of type {6,9} Chiral Genus 25 map C25.2* of type {9,6} Chiral Genus 25 map C25.2*# of type {9,6} Chiral Group <216,97> Number of orientably-regular maps = 2 Genus 25 map R25.20 of type {6,9} Reflexible Genus 25 map R25.20* of type {9,6} Reflexible Group <216,98> Number of orientably-regular maps = 2 Genus 37 map R37.37 of type {9,18} Reflexible Genus 37 map R37.37* of type {18,9} Reflexible Group <216,99> Number of orientably-regular maps = 2 Genus 1 map R1.9 of type {3,6} Reflexible Genus 1 map R1.9* of type {6,3} Reflexible Group <216,100> Number of orientably-regular maps = 3 Genus 19 map R19.8 of type {4,12} Reflexible Genus 19 map R19.8* of type {12,4} Reflexible Genus 37 map R37.40 of type {12,12} Reflexible Self-dual Group <216,120> Number of orientably-regular maps = 1 Genus 37 map R37.42 of type {12,12} Reflexible Self-dual Group <216,122> Number of orientably-regular maps = 2 Genus 28 map R28.18 of type {6,12} Reflexible Genus 28 map R28.18* of type {12,6} Reflexible Group <216,154> Number of orientably-regular maps = 2 Genus 46 map C46.8 of type {24,24} Chiral Self-dual Genus 46 map C46.8# of type {24,24} Chiral Self-dual Group <216,156> Number of orientably-regular maps = 2 Genus 19 map R19.9 of type {4,12} Reflexible Genus 19 map R19.9* of type {12,4} Reflexible Group <216,157> Number of orientably-regular maps = 2 Genus 28 map R28.13 of type {6,12} Reflexible Genus 28 map R28.13* of type {12,6} Reflexible Group <216,158> Number of orientably-regular maps = 2 Genus 10 map R10.8 of type {4,6} Reflexible Genus 10 map R10.8* of type {6,4} Reflexible Group <216,159> Number of orientably-regular maps = 2 Genus 28 map R28.14 of type {6,12} Reflexible Genus 28 map R28.14* of type {12,6} Reflexible Group <216,168> Number of orientably-regular maps = 1 Genus 37 map R37.39 of type {12,12} Reflexible Self-dual ............................................................................... Groups of order 218 Total = 2 Group <218,1> Number of orientably-regular maps = 2 Genus 0 map R0.108 of type {2,109} Reflexible Genus 0 map R0.108* of type {109,2} Reflexible Group <218,2> Number of orientably-regular maps = 2 Genus 54 map R54.18 of type {109,218} Reflexible Genus 54 map R54.18* of type {218,109} Reflexible ............................................................................... Groups of order 220 Total = 15 Group <220,6> Number of orientably-regular maps = 1 Genus 55 map R55.57 of type {220,220} Reflexible Self-dual Group <220,7> Number of orientably-regular maps = 8 Genus 34 map C34.3 of type {10,10} Chiral Non-SD Non-MSD Genus 34 map C34.3# of type {10,10} Chiral Non-SD Non-MSD Genus 34 map C34.3* of type {10,10} Chiral Non-SD Non-MSD Genus 34 map C34.3*# of type {10,10} Chiral Non-SD Non-MSD Genus 34 map C34.4 of type {10,10} Chiral Non-SD Non-MSD Genus 34 map C34.4# of type {10,10} Chiral Non-SD Non-MSD Genus 34 map C34.4* of type {10,10} Chiral Non-SD Non-MSD Genus 34 map C34.4*# of type {10,10} Chiral Non-SD Non-MSD Group <220,9> Number of orientably-regular maps = 2 Genus 51 map C51.20 of type {44,44} Chiral Self-dual Genus 51 map C51.20# of type {44,44} Chiral Self-dual Group <220,11> Number of orientably-regular maps = 2 Genus 40 map R40.12 of type {10,22} Reflexible Genus 40 map R40.12* of type {22,10} Reflexible Group <220,12> Number of orientably-regular maps = 2 Genus 44 map R44.7 of type {10,110} Reflexible Genus 44 map R44.7* of type {110,10} Reflexible Group <220,13> Number of orientably-regular maps = 2 Genus 50 map R50.13 of type {22,110} Reflexible Genus 50 map R50.13* of type {110,22} Reflexible Group <220,14> Number of orientably-regular maps = 2 Genus 0 map R0.109 of type {2,110} Reflexible Genus 0 map R0.109* of type {110,2} Reflexible Group <220,15> Number of orientably-regular maps = 1 Genus 54 map R54.19 of type {110,110} Reflexible Self-dual ............................................................................... Groups of order 222 Total = 6 Group <222,1> Number of orientably-regular maps = 4 Genus 1 map C1.7 of type {3,6} Chiral Genus 1 map C1.7# of type {3,6} Chiral Genus 1 map C1.7* of type {6,3} Chiral Genus 1 map C1.7*# of type {6,3} Chiral Group <222,3> Number of orientably-regular maps = 2 Genus 54 map R54.17 of type {74,111} Reflexible Genus 54 map R54.17* of type {111,74} Reflexible Group <222,4> Number of orientably-regular maps = 2 Genus 37 map R37.34 of type {6,111} Reflexible Genus 37 map R37.34* of type {111,6} Reflexible Group <222,5> Number of orientably-regular maps = 2 Genus 0 map R0.110 of type {2,111} Reflexible Genus 0 map R0.110* of type {111,2} Reflexible Group <222,6> Number of orientably-regular maps = 2 Genus 55 map R55.54 of type {111,222} Reflexible Genus 55 map R55.54* of type {222,111} Reflexible ............................................................................... Groups of order 224 Total = 197 Group <224,2> Number of orientably-regular maps = 1 Genus 56 map R56.25 of type {224,224} Reflexible Self-dual Group <224,3> Number of orientably-regular maps = 2 Genus 49 map R49.96 of type {16,112} Reflexible Genus 49 map R49.96* of type {112,16} Reflexible Group <224,4> Number of orientably-regular maps = 2 Genus 49 map R49.97 of type {16,112} Reflexible Genus 49 map R49.97* of type {112,16} Reflexible Group <224,5> Number of orientably-regular maps = 2 Genus 0 map R0.111 of type {2,112} Reflexible Genus 0 map R0.111* of type {112,2} Reflexible Group <224,6> Number of orientably-regular maps = 2 Genus 28 map R28.8 of type {4,112} Reflexible Genus 28 map R28.8* of type {112,4} Reflexible Group <224,11> Number of orientably-regular maps = 2 Genus 39 map R39.7 of type {8,28} Reflexible Genus 39 map R39.7* of type {28,8} Reflexible Group <224,12> Number of orientably-regular maps = 2 Genus 25 map R25.15 of type {4,28} Reflexible Genus 25 map R25.15* of type {28,4} Reflexible Group <224,15> Number of orientably-regular maps = 2 Genus 39 map R39.6 of type {8,28} Reflexible Genus 39 map R39.6* of type {28,8} Reflexible Group <224,26> Number of orientably-regular maps = 2 Genus 41 map R41.51 of type {8,56} Reflexible Genus 41 map R41.51* of type {56,8} Reflexible Group <224,27> Number of orientably-regular maps = 2 Genus 27 map R27.2 of type {4,56} Reflexible Genus 27 map R27.2* of type {56,4} Reflexible Group <224,29> Number of orientably-regular maps = 2 Genus 41 map R41.50 of type {8,56} Reflexible Genus 41 map R41.50* of type {56,8} Reflexible Group <224,31> Number of orientably-regular maps = 2 Genus 27 map R27.3 of type {4,56} Reflexible Genus 27 map R27.3* of type {56,4} Reflexible Group <224,32> Number of orientably-regular maps = 2 Genus 42 map R42.8 of type {14,16} Reflexible Genus 42 map R42.8* of type {16,14} Reflexible Group <224,34> Number of orientably-regular maps = 2 Genus 46 map R46.31 of type {16,28} Reflexible Genus 46 map R46.31* of type {28,16} Reflexible Group <224,47> Number of orientably-regular maps = 1 Genus 53 map R53.24 of type {56,56} Reflexible Self-dual Group <224,48> Number of orientably-regular maps = 1 Genus 49 map R49.101 of type {28,28} Reflexible Self-dual Group <224,49> Number of orientably-regular maps = 1 Genus 53 map R53.25 of type {56,56} Reflexible Self-dual Group <224,51> Number of orientably-regular maps = 2 Genus 51 map R51.28 of type {28,56} Reflexible Genus 51 map R51.28* of type {56,28} Reflexible Group <224,53> Number of orientably-regular maps = 2 Genus 51 map R51.29 of type {28,56} Reflexible Genus 51 map R51.29* of type {56,28} Reflexible Group <224,58> Number of orientably-regular maps = 1 Genus 55 map R55.56 of type {112,112} Reflexible Self-dual Group <224,59> Number of orientably-regular maps = 1 Genus 55 map R55.55 of type {112,112} Reflexible Self-dual Group <224,60> Number of orientably-regular maps = 2 Genus 48 map R48.10 of type {14,112} Reflexible Genus 48 map R48.10* of type {112,14} Reflexible Group <224,61> Number of orientably-regular maps = 2 Genus 52 map R52.14 of type {28,112} Reflexible Genus 52 map R52.14* of type {112,28} Reflexible Group <224,173> Number of orientably-regular maps = 4 Genus 49 map C49.8 of type {28,28} Chiral Mirror-self-dual Genus 49 map C49.8# of type {28,28} Chiral Mirror-self-dual Genus 49 map C49.9 of type {28,28} Chiral Mirror-self-dual Genus 49 map C49.9# of type {28,28} Chiral Mirror-self-dual Group <224,195> Number of orientably-regular maps = 2 Genus 41 map C41.24 of type {14,14} Chiral Mirror-self-dual Genus 41 map C41.24# of type {14,14} Chiral Mirror-self-dual ............................................................................... Groups of order 226 Total = 2 Group <226,1> Number of orientably-regular maps = 2 Genus 0 map R0.112 of type {2,113} Reflexible Genus 0 map R0.112* of type {113,2} Reflexible Group <226,2> Number of orientably-regular maps = 2 Genus 56 map R56.23 of type {113,226} Reflexible Genus 56 map R56.23* of type {226,113} Reflexible ............................................................................... Groups of order 228 Total = 15 Group <228,6> Number of orientably-regular maps = 1 Genus 57 map R57.72 of type {228,228} Reflexible Self-dual Group <228,7> Number of orientably-regular maps = 4 Genus 20 map C20.1 of type {6,6} Chiral Non-SD Non-MSD Genus 20 map C20.1# of type {6,6} Chiral Non-SD Non-MSD Genus 20 map C20.1* of type {6,6} Chiral Non-SD Non-MSD Genus 20 map C20.1*# of type {6,6} Chiral Non-SD Non-MSD Group <228,8> Number of orientably-regular maps = 2 Genus 36 map R36.13 of type {6,38} Reflexible Genus 36 map R36.13* of type {38,6} Reflexible Group <228,10> Number of orientably-regular maps = 1 Genus 54 map R54.16 of type {57,57} Reflexible Self-dual Group <228,12> Number of orientably-regular maps = 2 Genus 38 map R38.4 of type {6,114} Reflexible Genus 38 map R38.4* of type {114,6} Reflexible Group <228,13> Number of orientably-regular maps = 2 Genus 54 map R54.15 of type {38,114} Reflexible Genus 54 map R54.15* of type {114,38} Reflexible Group <228,14> Number of orientably-regular maps = 2 Genus 0 map R0.113 of type {2,114} Reflexible Genus 0 map R0.113* of type {114,2} Reflexible Group <228,15> Number of orientably-regular maps = 1 Genus 56 map R56.24 of type {114,114} Reflexible Self-dual ............................................................................... Groups of order 230 Total = 4 Group <230,1> Number of orientably-regular maps = 2 Genus 55 map R55.53 of type {46,115} Reflexible Genus 55 map R55.53* of type {115,46} Reflexible Group <230,2> Number of orientably-regular maps = 2 Genus 46 map R46.30 of type {10,115} Reflexible Genus 46 map R46.30* of type {115,10} Reflexible Group <230,3> Number of orientably-regular maps = 2 Genus 0 map R0.114 of type {2,115} Reflexible Genus 0 map R0.114* of type {115,2} Reflexible Group <230,4> Number of orientably-regular maps = 2 Genus 57 map R57.70 of type {115,230} Reflexible Genus 57 map R57.70* of type {230,115} Reflexible ............................................................................... Groups of order 232 Total = 14 Group <232,2> Number of orientably-regular maps = 1 Genus 58 map R58.18 of type {232,232} Reflexible Self-dual Group <232,5> Number of orientably-regular maps = 2 Genus 29 map R29.6 of type {4,116} Reflexible Genus 29 map R29.6* of type {116,4} Reflexible Group <232,6> Number of orientably-regular maps = 2 Genus 0 map R0.115 of type {2,116} Reflexible Genus 0 map R0.115* of type {116,2} Reflexible Group <232,8> Number of orientably-regular maps = 2 Genus 28 map R28.7 of type {4,58} Reflexible Genus 28 map R28.7* of type {58,4} Reflexible Group <232,9> Number of orientably-regular maps = 1 Genus 57 map R57.71 of type {116,116} Reflexible Self-dual Group <232,10> Number of orientably-regular maps = 2 Genus 56 map R56.22 of type {58,116} Reflexible Genus 56 map R56.22* of type {116,58} Reflexible Group <232,12> Number of orientably-regular maps = 2 Genus 1 map C1.31 of type {4,4} Chiral Self-dual Genus 1 map C1.31# of type {4,4} Chiral Self-dual ............................................................................... Groups of order 234 Total = 16 Group <234,1> Number of orientably-regular maps = 4 Genus 40 map C40.6 of type {9,18} Chiral Genus 40 map C40.6# of type {9,18} Chiral Genus 40 map C40.6* of type {18,9} Chiral Genus 40 map C40.6*# of type {18,9} Chiral Group <234,3> Number of orientably-regular maps = 2 Genus 54 map R54.12 of type {26,117} Reflexible Genus 54 map R54.12* of type {117,26} Reflexible Group <234,4> Number of orientably-regular maps = 2 Genus 52 map R52.12 of type {18,117} Reflexible Genus 52 map R52.12* of type {117,18} Reflexible Group <234,5> Number of orientably-regular maps = 2 Genus 0 map R0.116 of type {2,117} Reflexible Genus 0 map R0.116* of type {117,2} Reflexible Group <234,6> Number of orientably-regular maps = 2 Genus 58 map R58.16 of type {117,234} Reflexible Genus 58 map R58.16* of type {234,117} Reflexible Group <234,9> Number of orientably-regular maps = 4 Genus 1 map C1.8 of type {3,6} Chiral Genus 1 map C1.8# of type {3,6} Chiral Genus 1 map C1.8* of type {6,3} Chiral Genus 1 map C1.8*# of type {6,3} Chiral Group <234,12> Number of orientably-regular maps = 2 Genus 55 map R55.52 of type {39,78} Reflexible Genus 55 map R55.52* of type {78,39} Reflexible Group <234,13> Number of orientably-regular maps = 2 Genus 37 map R37.33 of type {6,39} Reflexible Genus 37 map R37.33* of type {39,6} Reflexible ............................................................................... Groups of order 236 Total = 4 Group <236,2> Number of orientably-regular maps = 1 Genus 59 map R59.11 of type {236,236} Reflexible Self-dual Group <236,3> Number of orientably-regular maps = 2 Genus 0 map R0.117 of type {2,118} Reflexible Genus 0 map R0.117* of type {118,2} Reflexible Group <236,4> Number of orientably-regular maps = 1 Genus 58 map R58.17 of type {118,118} Reflexible Self-dual ............................................................................... Groups of order 238 Total = 4 Group <238,1> Number of orientably-regular maps = 2 Genus 56 map R56.20 of type {34,119} Reflexible Genus 56 map R56.20* of type {119,34} Reflexible Group <238,2> Number of orientably-regular maps = 2 Genus 51 map R51.25 of type {14,119} Reflexible Genus 51 map R51.25* of type {119,14} Reflexible Group <238,3> Number of orientably-regular maps = 2 Genus 0 map R0.118 of type {2,119} Reflexible Genus 0 map R0.118* of type {119,2} Reflexible Group <238,4> Number of orientably-regular maps = 2 Genus 59 map R59.8 of type {119,238} Reflexible Genus 59 map R59.8* of type {238,119} Reflexible ............................................................................... Groups of order 240 Total = 208 Group <240,4> Number of orientably-regular maps = 1 Genus 60 map R60.20 of type {240,240} Reflexible Self-dual Group <240,9> Number of orientably-regular maps = 2 Genus 53 map R53.21 of type {24,40} Reflexible Genus 53 map R53.21* of type {40,24} Reflexible Group <240,12> Number of orientably-regular maps = 2 Genus 53 map R53.22 of type {24,40} Reflexible Genus 53 map R53.22* of type {40,24} Reflexible Group <240,14> Number of orientably-regular maps = 2 Genus 38 map R38.3 of type {6,40} Reflexible Genus 38 map R38.3* of type {40,6} Reflexible Group <240,15> Number of orientably-regular maps = 2 Genus 44 map R44.6 of type {10,24} Reflexible Genus 44 map R44.6* of type {24,10} Reflexible Group <240,19> Number of orientably-regular maps = 2 Genus 48 map R48.8 of type {12,40} Reflexible Genus 48 map R48.8* of type {40,12} Reflexible Group <240,21> Number of orientably-regular maps = 2 Genus 50 map R50.12 of type {20,24} Reflexible Genus 50 map R50.12* of type {24,20} Reflexible Group <240,28> Number of orientably-regular maps = 2 Genus 45 map R45.28 of type {12,20} Reflexible Genus 45 map R45.28* of type {20,12} Reflexible Group <240,33> Number of orientably-regular maps = 2 Genus 55 map R55.48 of type {24,120} Reflexible Genus 55 map R55.48* of type {120,24} Reflexible Group <240,34> Number of orientably-regular maps = 2 Genus 55 map R55.49 of type {24,120} Reflexible Genus 55 map R55.49* of type {120,24} Reflexible Group <240,35> Number of orientably-regular maps = 2 Genus 50 map R50.10 of type {12,120} Reflexible Genus 50 map R50.10* of type {120,12} Reflexible Group <240,36> Number of orientably-regular maps = 2 Genus 40 map R40.8 of type {6,120} Reflexible Genus 40 map R40.8* of type {120,6} Reflexible Group <240,43> Number of orientably-regular maps = 2 Genus 49 map R49.74 of type {12,60} Reflexible Genus 49 map R49.74* of type {60,12} Reflexible Group <240,44> Number of orientably-regular maps = 2 Genus 52 map R52.13 of type {24,30} Reflexible Genus 52 map R52.13* of type {30,24} Reflexible Group <240,46> Number of orientably-regular maps = 2 Genus 54 map R54.11 of type {24,60} Reflexible Genus 54 map R54.11* of type {60,24} Reflexible Group <240,49> Number of orientably-regular maps = 2 Genus 57 map R57.65 of type {40,120} Reflexible Genus 57 map R57.65* of type {120,40} Reflexible Group <240,50> Number of orientably-regular maps = 2 Genus 57 map R57.66 of type {40,120} Reflexible Genus 57 map R57.66* of type {120,40} Reflexible Group <240,51> Number of orientably-regular maps = 2 Genus 54 map R54.10 of type {20,120} Reflexible Genus 54 map R54.10* of type {120,20} Reflexible Group <240,52> Number of orientably-regular maps = 2 Genus 48 map R48.7 of type {10,120} Reflexible Genus 48 map R48.7* of type {120,10} Reflexible Group <240,59> Number of orientably-regular maps = 2 Genus 53 map R53.20 of type {20,60} Reflexible Genus 53 map R53.20* of type {60,20} Reflexible Group <240,60> Number of orientably-regular maps = 2 Genus 54 map R54.14 of type {30,40} Reflexible Genus 54 map R54.14* of type {40,30} Reflexible Group <240,62> Number of orientably-regular maps = 2 Genus 56 map R56.21 of type {40,60} Reflexible Genus 56 map R56.21* of type {60,40} Reflexible Group <240,65> Number of orientably-regular maps = 2 Genus 45 map R45.24 of type {8,120} Reflexible Genus 45 map R45.24* of type {120,8} Reflexible Group <240,66> Number of orientably-regular maps = 2 Genus 45 map R45.23 of type {8,120} Reflexible Genus 45 map R45.23* of type {120,8} Reflexible Group <240,67> Number of orientably-regular maps = 2 Genus 30 map R30.3 of type {4,120} Reflexible Genus 30 map R30.3* of type {120,4} Reflexible Group <240,68> Number of orientably-regular maps = 2 Genus 0 map R0.119 of type {2,120} Reflexible Genus 0 map R0.119* of type {120,2} Reflexible Group <240,75> Number of orientably-regular maps = 2 Genus 29 map R29.5 of type {4,60} Reflexible Genus 29 map R29.5* of type {60,4} Reflexible Group <240,76> Number of orientably-regular maps = 2 Genus 42 map R42.6 of type {8,30} Reflexible Genus 42 map R42.6* of type {30,8} Reflexible Group <240,78> Number of orientably-regular maps = 2 Genus 44 map R44.5 of type {8,60} Reflexible Genus 44 map R44.5* of type {60,8} Reflexible Group <240,82> Number of orientably-regular maps = 1 Genus 57 map R57.69 of type {60,60} Reflexible Self-dual Group <240,84> Number of orientably-regular maps = 1 Genus 59 map R59.10 of type {120,120} Reflexible Self-dual Group <240,85> Number of orientably-regular maps = 1 Genus 59 map R59.9 of type {120,120} Reflexible Self-dual Group <240,86> Number of orientably-regular maps = 2 Genus 56 map R56.19 of type {30,120} Reflexible Genus 56 map R56.19* of type {120,30} Reflexible Group <240,87> Number of orientably-regular maps = 2 Genus 58 map R58.15 of type {60,120} Reflexible Genus 58 map R58.15* of type {120,60} Reflexible Group <240,90> Number of orientably-regular maps = 8 Genus 17 map R17.16 of type {5,6} Reflexible Genus 17 map R17.16* of type {6,5} Reflexible Genus 22 map R22.7 of type {5,8} Reflexible Genus 22 map R22.7* of type {8,5} Reflexible Genus 29 map R29.12 of type {6,10} Reflexible Genus 29 map R29.12* of type {10,6} Reflexible Genus 34 map R34.11 of type {8,10} Reflexible Genus 34 map R34.11* of type {10,8} Reflexible Group <240,91> Number of orientably-regular maps = 6 Genus 21 map R21.4 of type {4,12} Reflexible Genus 21 map R21.4* of type {12,4} Reflexible Genus 21 map R21.5 of type {4,12} Reflexible Genus 21 map R21.5* of type {12,4} Reflexible Genus 41 map R41.52 of type {12,12} Reflexible Self-dual Genus 41 map R41.53 of type {12,12} Reflexible Self-dual Group <240,92> Number of orientably-regular maps = 6 Genus 45 map R45.26 of type {12,20} Reflexible Genus 45 map R45.26* of type {20,12} Reflexible Genus 45 map R45.27 of type {12,20} Reflexible Genus 45 map R45.27* of type {20,12} Reflexible Genus 49 map R49.98 of type {20,20} Reflexible Self-dual Genus 49 map R49.99 of type {20,20} Reflexible Self-dual Group <240,93> Number of orientably-regular maps = 12 Genus 15 map R15.3 of type {3,20} Reflexible Genus 15 map R15.3* of type {20,3} Reflexible Genus 27 map R27.5 of type {5,12} Reflexible Genus 27 map R27.5* of type {12,5} Reflexible Genus 31 map R31.11 of type {5,20} Reflexible Genus 31 map R31.11* of type {20,5} Reflexible Genus 35 map R35.5 of type {6,20} Reflexible Genus 35 map R35.5* of type {20,6} Reflexible Genus 39 map R39.10 of type {10,12} Reflexible Genus 39 map R39.10* of type {12,10} Reflexible Genus 43 map R43.18 of type {10,20} Reflexible Genus 43 map R43.18* of type {20,10} Reflexible Group <240,96> Number of orientably-regular maps = 4 Genus 21 map C21.4 of type {4,12} Chiral Genus 21 map C21.4# of type {4,12} Chiral Genus 21 map C21.4* of type {12,4} Chiral Genus 21 map C21.4*# of type {12,4} Chiral Group <240,99> Number of orientably-regular maps = 4 Genus 41 map C41.21 of type {8,24} Chiral Genus 41 map C41.21# of type {8,24} Chiral Genus 41 map C41.21* of type {24,8} Chiral Genus 41 map C41.21*# of type {24,8} Chiral Group <240,101> Number of orientably-regular maps = 4 Genus 41 map C41.20 of type {8,24} Chiral Genus 41 map C41.20# of type {8,24} Chiral Genus 41 map C41.20* of type {24,8} Chiral Genus 41 map C41.20*# of type {24,8} Chiral Group <240,103> Number of orientably-regular maps = 4 Genus 50 map R50.11 of type {15,40} Reflexible Genus 50 map R50.11* of type {40,15} Reflexible Genus 54 map R54.13 of type {30,40} Reflexible Genus 54 map R54.13* of type {40,30} Reflexible Group <240,106> Number of orientably-regular maps = 4 Genus 38 map R38.5 of type {8,15} Reflexible Genus 38 map R38.5* of type {15,8} Reflexible Genus 42 map R42.5 of type {8,30} Reflexible Genus 42 map R42.5* of type {30,8} Reflexible Group <240,108> Number of orientably-regular maps = 4 Genus 43 map R43.19 of type {12,15} Reflexible Genus 43 map R43.19* of type {15,12} Reflexible Genus 47 map R47.9 of type {12,30} Reflexible Genus 47 map R47.9* of type {30,12} Reflexible Group <240,111> Number of orientably-regular maps = 2 Genus 51 map C51.18 of type {24,24} Chiral Self-dual Genus 51 map C51.18# of type {24,24} Chiral Self-dual Group <240,112> Number of orientably-regular maps = 2 Genus 51 map C51.19 of type {24,24} Chiral Self-dual Genus 51 map C51.19# of type {24,24} Chiral Self-dual Group <240,117> Number of orientably-regular maps = 2 Genus 41 map C41.23 of type {12,12} Chiral Self-dual Genus 41 map C41.23# of type {12,12} Chiral Self-dual Group <240,152> Number of orientably-regular maps = 2 Genus 57 map R57.67 of type {60,60} Reflexible Self-dual Genus 57 map R57.68 of type {60,60} Reflexible Self-dual Group <240,154> Number of orientably-regular maps = 4 Genus 51 map R51.26 of type {15,60} Reflexible Genus 51 map R51.26* of type {60,15} Reflexible Genus 55 map R55.51 of type {30,60} Reflexible Genus 55 map R55.51* of type {60,30} Reflexible Group <240,189> Number of orientably-regular maps = 7 Genus 11 map R11.1 of type {4,6} Reflexible Genus 11 map R11.1* of type {6,4} Reflexible Genus 19 map R19.7 of type {4,10} Reflexible Genus 19 map R19.7* of type {10,4} Reflexible Genus 21 map R21.14 of type {6,6} Reflexible Self-dual Genus 29 map R29.11 of type {6,10} Reflexible Genus 29 map R29.11* of type {10,6} Reflexible Group <240,190> Number of orientably-regular maps = 3 Genus 29 map R29.10 of type {6,10} Reflexible Genus 29 map R29.10* of type {10,6} Reflexible Genus 37 map R37.38 of type {10,10} Reflexible Self-dual Group <240,191> Number of orientably-regular maps = 2 Genus 45 map C45.2 of type {15,15} Chiral Mirror-self-dual Genus 45 map C45.2# of type {15,15} Chiral Mirror-self-dual Group <240,193> Number of orientably-regular maps = 2 Genus 41 map C41.22 of type {12,12} Chiral Self-dual Genus 41 map C41.22# of type {12,12} Chiral Self-dual Group <240,194> Number of orientably-regular maps = 2 Genus 35 map R35.4 of type {6,20} Reflexible Genus 35 map R35.4* of type {20,6} Reflexible Group <240,196> Number of orientably-regular maps = 2 Genus 51 map R51.27 of type {20,30} Reflexible Genus 51 map R51.27* of type {30,20} Reflexible Group <240,197> Number of orientably-regular maps = 2 Genus 27 map R27.1 of type {4,30} Reflexible Genus 27 map R27.1* of type {30,4} Reflexible Group <240,198> Number of orientably-regular maps = 2 Genus 37 map R37.32 of type {6,30} Reflexible Genus 37 map R37.32* of type {30,6} Reflexible Group <240,199> Number of orientably-regular maps = 1 Genus 45 map R45.30 of type {15,15} Reflexible Self-dual Group <240,203> Number of orientably-regular maps = 1 Genus 53 map R53.23 of type {30,30} Reflexible Self-dual ............................................................................... Groups of order 242 Total = 5 Group <242,1> Number of orientably-regular maps = 2 Genus 0 map R0.120 of type {2,121} Reflexible Genus 0 map R0.120* of type {121,2} Reflexible Group <242,2> Number of orientably-regular maps = 2 Genus 60 map R60.18 of type {121,242} Reflexible Genus 60 map R60.18* of type {242,121} Reflexible Group <242,3> Number of orientably-regular maps = 2 Genus 45 map R45.25 of type {11,22} Reflexible Genus 45 map R45.25* of type {22,11} Reflexible ............................................................................... Groups of order 244 Total = 5 Group <244,2> Number of orientably-regular maps = 1 Genus 61 map R61.37 of type {244,244} Reflexible Self-dual Group <244,3> Number of orientably-regular maps = 2 Genus 1 map C1.32 of type {4,4} Chiral Self-dual Genus 1 map C1.32# of type {4,4} Chiral Self-dual Group <244,4> Number of orientably-regular maps = 2 Genus 0 map R0.121 of type {2,122} Reflexible Genus 0 map R0.121* of type {122,2} Reflexible Group <244,5> Number of orientably-regular maps = 1 Genus 60 map R60.19 of type {122,122} Reflexible Self-dual ............................................................................... Groups of order 246 Total = 4 Group <246,1> Number of orientably-regular maps = 2 Genus 60 map R60.17 of type {82,123} Reflexible Genus 60 map R60.17* of type {123,82} Reflexible Group <246,2> Number of orientably-regular maps = 2 Genus 41 map R41.35 of type {6,123} Reflexible Genus 41 map R41.35* of type {123,6} Reflexible Group <246,3> Number of orientably-regular maps = 2 Genus 0 map R0.122 of type {2,123} Reflexible Genus 0 map R0.122* of type {123,2} Reflexible Group <246,4> Number of orientably-regular maps = 2 Genus 61 map R61.35 of type {123,246} Reflexible Genus 61 map R61.35* of type {246,123} Reflexible ............................................................................... Groups of order 248 Total = 12 Group <248,2> Number of orientably-regular maps = 1 Genus 62 map R62.11 of type {248,248} Reflexible Self-dual Group <248,4> Number of orientably-regular maps = 2 Genus 31 map R31.10 of type {4,124} Reflexible Genus 31 map R31.10* of type {124,4} Reflexible Group <248,5> Number of orientably-regular maps = 2 Genus 0 map R0.123 of type {2,124} Reflexible Genus 0 map R0.123* of type {124,2} Reflexible Group <248,7> Number of orientably-regular maps = 2 Genus 30 map R30.2 of type {4,62} Reflexible Genus 30 map R30.2* of type {62,4} Reflexible Group <248,8> Number of orientably-regular maps = 1 Genus 61 map R61.36 of type {124,124} Reflexible Self-dual Group <248,9> Number of orientably-regular maps = 2 Genus 60 map R60.15 of type {62,124} Reflexible Genus 60 map R60.15* of type {124,62} Reflexible ............................................................................... Groups of order 250 Total = 15 Group <250,1> Number of orientably-regular maps = 2 Genus 0 map R0.124 of type {2,125} Reflexible Genus 0 map R0.124* of type {125,2} Reflexible Group <250,2> Number of orientably-regular maps = 2 Genus 62 map R62.9 of type {125,250} Reflexible Genus 62 map R62.9* of type {250,125} Reflexible Group <250,3> Number of orientably-regular maps = 2 Genus 46 map R46.29 of type {10,25} Reflexible Genus 46 map R46.29* of type {25,10} Reflexible Group <250,4> Number of orientably-regular maps = 2 Genus 56 map R56.18 of type {25,50} Reflexible Genus 56 map R56.18* of type {50,25} Reflexible Group <250,5> Number of orientably-regular maps = 2 Genus 26 map R26.5 of type {5,10} Reflexible Genus 26 map R26.5* of type {10,5} Reflexible Group <250,6> Number of orientably-regular maps = 8 Genus 46 map C46.6 of type {10,25} Chiral Genus 46 map C46.6# of type {10,25} Chiral Genus 46 map C46.6* of type {25,10} Chiral Genus 46 map C46.6*# of type {25,10} Chiral Genus 46 map C46.7 of type {10,25} Chiral Genus 46 map C46.7# of type {10,25} Chiral Genus 46 map C46.7* of type {25,10} Chiral Genus 46 map C46.7*# of type {25,10} Chiral ............................................................................... Groups of order 252 Total = 46 Group <252,6> Number of orientably-regular maps = 1 Genus 63 map R63.26 of type {252,252} Reflexible Self-dual Group <252,7> Number of orientably-regular maps = 4 Genus 50 map C50.7 of type {18,18} Chiral Non-SD Non-MSD Genus 50 map C50.7# of type {18,18} Chiral Non-SD Non-MSD Genus 50 map C50.7* of type {18,18} Chiral Non-SD Non-MSD Genus 50 map C50.7*# of type {18,18} Chiral Non-SD Non-MSD Group <252,8> Number of orientably-regular maps = 2 Genus 48 map R48.9 of type {14,18} Reflexible Genus 48 map R48.9* of type {18,14} Reflexible Group <252,10> Number of orientably-regular maps = 1 Genus 60 map R60.16 of type {63,63} Reflexible Self-dual Group <252,12> Number of orientably-regular maps = 2 Genus 56 map R56.17 of type {18,126} Reflexible Genus 56 map R56.17* of type {126,18} Reflexible Group <252,13> Number of orientably-regular maps = 2 Genus 54 map R54.9 of type {14,126} Reflexible Genus 54 map R54.9* of type {126,14} Reflexible Group <252,14> Number of orientably-regular maps = 2 Genus 0 map R0.125 of type {2,126} Reflexible Genus 0 map R0.125* of type {126,2} Reflexible Group <252,15> Number of orientably-regular maps = 1 Genus 62 map R62.10 of type {126,126} Reflexible Self-dual Group <252,26> Number of orientably-regular maps = 4 Genus 22 map C22.2 of type {6,6} Chiral Non-SD Non-MSD Genus 22 map C22.2# of type {6,6} Chiral Non-SD Non-MSD Genus 22 map C22.2* of type {6,6} Chiral Non-SD Non-MSD Genus 22 map C22.2*# of type {6,6} Chiral Non-SD Non-MSD Group <252,30> Number of orientably-regular maps = 4 Genus 22 map C22.3 of type {6,6} Chiral Non-SD Non-MSD Genus 22 map C22.3# of type {6,6} Chiral Non-SD Non-MSD Genus 22 map C22.3* of type {6,6} Chiral Non-SD Non-MSD Genus 22 map C22.3*# of type {6,6} Chiral Non-SD Non-MSD Group <252,31> Number of orientably-regular maps = 1 Genus 55 map R55.50 of type {28,28} Reflexible Self-dual Group <252,33> Number of orientably-regular maps = 2 Genus 40 map R40.5 of type {6,42} Reflexible Genus 40 map R40.5* of type {42,6} Reflexible Group <252,35> Number of orientably-regular maps = 1 Genus 58 map R58.13 of type {42,42} Reflexible Self-dual Group <252,36> Number of orientably-regular maps = 2 Genus 40 map R40.6 of type {6,42} Reflexible Genus 40 map R40.6* of type {42,6} Reflexible Group <252,42> Number of orientably-regular maps = 2 Genus 58 map R58.14 of type {42,42} Reflexible Non-self-dual Genus 58 map R58.14* of type {42,42} Reflexible Non-self-dual Group <252,43> Number of orientably-regular maps = 2 Genus 40 map R40.7 of type {6,42} Reflexible Genus 40 map R40.7* of type {42,6} Reflexible ............................................................................... Groups of order 254 Total = 2 Group <254,1> Number of orientably-regular maps = 2 Genus 0 map R0.126 of type {2,127} Reflexible Genus 0 map R0.126* of type {127,2} Reflexible Group <254,2> Number of orientably-regular maps = 2 Genus 63 map R63.23 of type {127,254} Reflexible Genus 63 map R63.23* of type {254,127} Reflexible ............................................................................... Groups of order 256 Total = 56092 Group <256,1> Number of orientably-regular maps = 1 Genus 64 map R64.43 of type {256,256} Reflexible Self-dual Group <256,42> Number of orientably-regular maps = 1 Genus 49 map R49.90 of type {16,16} Reflexible Self-dual Group <256,44> Number of orientably-regular maps = 1 Genus 49 map R49.95 of type {16,16} Reflexible Self-dual Group <256,46> Number of orientably-regular maps = 1 Genus 49 map R49.91 of type {16,16} Reflexible Self-dual Group <256,48> Number of orientably-regular maps = 1 Genus 49 map R49.92 of type {16,16} Reflexible Self-dual Group <256,56> Number of orientably-regular maps = 2 Genus 49 map R49.77 of type {16,16} Reflexible Non-self-dual Genus 49 map R49.77* of type {16,16} Reflexible Non-self-dual Group <256,58> Number of orientably-regular maps = 2 Genus 49 map R49.80 of type {16,16} Reflexible Non-self-dual Genus 49 map R49.80* of type {16,16} Reflexible Non-self-dual Group <256,60> Number of orientably-regular maps = 2 Genus 49 map R49.78 of type {16,16} Reflexible Non-self-dual Genus 49 map R49.78* of type {16,16} Reflexible Non-self-dual Group <256,62> Number of orientably-regular maps = 2 Genus 49 map R49.79 of type {16,16} Reflexible Non-self-dual Genus 49 map R49.79* of type {16,16} Reflexible Non-self-dual Group <256,64> Number of orientably-regular maps = 2 Genus 25 map R25.9 of type {4,16} Reflexible Genus 25 map R25.9* of type {16,4} Reflexible Group <256,68> Number of orientably-regular maps = 2 Genus 41 map R41.38 of type {8,16} Reflexible Genus 41 map R41.38* of type {16,8} Reflexible Group <256,72> Number of orientably-regular maps = 2 Genus 41 map R41.40 of type {8,16} Reflexible Genus 41 map R41.40* of type {16,8} Reflexible Group <256,76> Number of orientably-regular maps = 2 Genus 41 map R41.37 of type {8,16} Reflexible Genus 41 map R41.37* of type {16,8} Reflexible Group <256,80> Number of orientably-regular maps = 1 Genus 49 map R49.85 of type {16,16} Reflexible Self-dual Group <256,82> Number of orientably-regular maps = 2 Genus 49 map R49.76 of type {16,16} Reflexible Non-self-dual Genus 49 map R49.76* of type {16,16} Reflexible Non-self-dual Group <256,84> Number of orientably-regular maps = 1 Genus 49 map R49.75 of type {16,16} Reflexible Self-dual Group <256,90> Number of orientably-regular maps = 1 Genus 49 map R49.84 of type {16,16} Reflexible Self-dual Group <256,91> Number of orientably-regular maps = 1 Genus 33 map R33.41 of type {8,8} Reflexible Self-dual Group <256,93> Number of orientably-regular maps = 1 Genus 49 map R49.83 of type {16,16} Reflexible Self-dual Group <256,94> Number of orientably-regular maps = 1 Genus 33 map R33.39 of type {8,8} Reflexible Self-dual Group <256,95> Number of orientably-regular maps = 1 Genus 49 map R49.82 of type {16,16} Reflexible Self-dual Group <256,97> Number of orientably-regular maps = 2 Genus 41 map R41.46 of type {8,16} Reflexible Genus 41 map R41.46* of type {16,8} Reflexible Group <256,98> Number of orientably-regular maps = 2 Genus 41 map R41.39 of type {8,16} Reflexible Genus 41 map R41.39* of type {16,8} Reflexible Group <256,100> Number of orientably-regular maps = 2 Genus 41 map R41.36 of type {8,16} Reflexible Genus 41 map R41.36* of type {16,8} Reflexible Group <256,102> Number of orientably-regular maps = 2 Genus 41 map R41.47 of type {8,16} Reflexible Genus 41 map R41.47* of type {16,8} Reflexible Group <256,103> Number of orientably-regular maps = 1 Genus 33 map R33.40 of type {8,8} Reflexible Self-dual Group <256,104> Number of orientably-regular maps = 1 Genus 49 map R49.81 of type {16,16} Reflexible Self-dual Group <256,322> Number of orientably-regular maps = 1 Genus 57 map R57.62 of type {32,32} Reflexible Self-dual Group <256,323> Number of orientably-regular maps = 1 Genus 57 map R57.61 of type {32,32} Reflexible Self-dual Group <256,324> Number of orientably-regular maps = 1 Genus 57 map R57.63 of type {32,32} Reflexible Self-dual Group <256,325> Number of orientably-regular maps = 1 Genus 57 map R57.64 of type {32,32} Reflexible Self-dual Group <256,326> Number of orientably-regular maps = 1 Genus 33 map R33.53 of type {8,8} Reflexible Self-dual Group <256,327> Number of orientably-regular maps = 1 Genus 33 map R33.52 of type {8,8} Reflexible Self-dual Group <256,328> Number of orientably-regular maps = 1 Genus 49 map R49.88 of type {16,16} Reflexible Self-dual Group <256,330> Number of orientably-regular maps = 1 Genus 49 map R49.89 of type {16,16} Reflexible Self-dual Group <256,332> Number of orientably-regular maps = 2 Genus 33 map R33.50 of type {8,8} Reflexible Non-self-dual Genus 33 map R33.50* of type {8,8} Reflexible Non-self-dual Group <256,333> Number of orientably-regular maps = 2 Genus 33 map R33.51 of type {8,8} Reflexible Non-self-dual Genus 33 map R33.51* of type {8,8} Reflexible Non-self-dual Group <256,334> Number of orientably-regular maps = 2 Genus 49 map R49.87 of type {16,16} Reflexible Non-self-dual Genus 49 map R49.87* of type {16,16} Reflexible Non-self-dual Group <256,335> Number of orientably-regular maps = 2 Genus 49 map R49.86 of type {16,16} Reflexible Non-self-dual Genus 49 map R49.86* of type {16,16} Reflexible Non-self-dual Group <256,340> Number of orientably-regular maps = 1 Genus 33 map R33.47 of type {8,8} Reflexible Self-dual Group <256,342> Number of orientably-regular maps = 1 Genus 33 map R33.49 of type {8,8} Reflexible Self-dual Group <256,344> Number of orientably-regular maps = 1 Genus 49 map R49.93 of type {16,16} Reflexible Self-dual Group <256,345> Number of orientably-regular maps = 1 Genus 49 map R49.94 of type {16,16} Reflexible Self-dual Group <256,367> Number of orientably-regular maps = 2 Genus 57 map R57.58 of type {32,32} Reflexible Non-self-dual Genus 57 map R57.58* of type {32,32} Reflexible Non-self-dual Group <256,368> Number of orientably-regular maps = 2 Genus 57 map R57.60 of type {32,32} Reflexible Non-self-dual Genus 57 map R57.60* of type {32,32} Reflexible Non-self-dual Group <256,369> Number of orientably-regular maps = 2 Genus 57 map R57.59 of type {32,32} Reflexible Non-self-dual Genus 57 map R57.59* of type {32,32} Reflexible Non-self-dual Group <256,370> Number of orientably-regular maps = 2 Genus 57 map R57.57 of type {32,32} Reflexible Non-self-dual Genus 57 map R57.57* of type {32,32} Reflexible Non-self-dual Group <256,371> Number of orientably-regular maps = 2 Genus 45 map R45.18 of type {8,32} Reflexible Genus 45 map R45.18* of type {32,8} Reflexible Group <256,373> Number of orientably-regular maps = 2 Genus 45 map R45.21 of type {8,32} Reflexible Genus 45 map R45.21* of type {32,8} Reflexible Group <256,375> Number of orientably-regular maps = 2 Genus 53 map R53.17 of type {16,32} Reflexible Genus 53 map R53.17* of type {32,16} Reflexible Group <256,376> Number of orientably-regular maps = 2 Genus 53 map R53.16 of type {16,32} Reflexible Genus 53 map R53.16* of type {32,16} Reflexible Group <256,377> Number of orientably-regular maps = 4 Genus 45 map C45.1 of type {8,32} Chiral Genus 45 map C45.1# of type {8,32} Chiral Genus 45 map C45.1* of type {32,8} Chiral Genus 45 map C45.1*# of type {32,8} Chiral Group <256,378> Number of orientably-regular maps = 4 Genus 53 map C53.12 of type {16,32} Chiral Genus 53 map C53.12# of type {16,32} Chiral Genus 53 map C53.12* of type {32,16} Chiral Genus 53 map C53.12*# of type {32,16} Chiral Group <256,382> Number of orientably-regular maps = 2 Genus 17 map R17.7 of type {4,8} Reflexible Genus 17 map R17.7* of type {8,4} Reflexible Group <256,383> Number of orientably-regular maps = 2 Genus 33 map R33.46 of type {8,8} Reflexible Non-self-dual Genus 33 map R33.46* of type {8,8} Reflexible Non-self-dual Group <256,384> Number of orientably-regular maps = 2 Genus 25 map R25.10 of type {4,16} Reflexible Genus 25 map R25.10* of type {16,4} Reflexible Group <256,385> Number of orientably-regular maps = 2 Genus 41 map R41.44 of type {8,16} Reflexible Genus 41 map R41.44* of type {16,8} Reflexible Group <256,386> Number of orientably-regular maps = 2 Genus 25 map R25.12 of type {4,16} Reflexible Genus 25 map R25.12* of type {16,4} Reflexible Group <256,388> Number of orientably-regular maps = 2 Genus 41 map R41.43 of type {8,16} Reflexible Genus 41 map R41.43* of type {16,8} Reflexible Group <256,390> Number of orientably-regular maps = 2 Genus 17 map R17.6 of type {4,8} Reflexible Genus 17 map R17.6* of type {8,4} Reflexible Group <256,392> Number of orientably-regular maps = 2 Genus 33 map R33.45 of type {8,8} Reflexible Non-self-dual Genus 33 map R33.45* of type {8,8} Reflexible Non-self-dual Group <256,394> Number of orientably-regular maps = 2 Genus 25 map R25.11 of type {4,16} Reflexible Genus 25 map R25.11* of type {16,4} Reflexible Group <256,395> Number of orientably-regular maps = 2 Genus 41 map R41.45 of type {8,16} Reflexible Genus 41 map R41.45* of type {16,8} Reflexible Group <256,396> Number of orientably-regular maps = 2 Genus 17 map R17.8 of type {4,8} Reflexible Genus 17 map R17.8* of type {8,4} Reflexible Group <256,397> Number of orientably-regular maps = 2 Genus 33 map R33.44 of type {8,8} Reflexible Non-self-dual Genus 33 map R33.44* of type {8,8} Reflexible Non-self-dual Group <256,402> Number of orientably-regular maps = 2 Genus 41 map R41.41 of type {8,16} Reflexible Genus 41 map R41.41* of type {16,8} Reflexible Group <256,403> Number of orientably-regular maps = 2 Genus 41 map R41.42 of type {8,16} Reflexible Genus 41 map R41.42* of type {16,8} Reflexible Group <256,404> Number of orientably-regular maps = 2 Genus 33 map R33.42 of type {8,8} Reflexible Non-self-dual Genus 33 map R33.42* of type {8,8} Reflexible Non-self-dual Group <256,405> Number of orientably-regular maps = 2 Genus 33 map R33.43 of type {8,8} Reflexible Non-self-dual Genus 33 map R33.43* of type {8,8} Reflexible Non-self-dual Group <256,406> Number of orientably-regular maps = 2 Genus 29 map R29.3 of type {4,32} Reflexible Genus 29 map R29.3* of type {32,4} Reflexible Group <256,408> Number of orientably-regular maps = 2 Genus 45 map R45.20 of type {8,32} Reflexible Genus 45 map R45.20* of type {32,8} Reflexible Group <256,410> Number of orientably-regular maps = 2 Genus 29 map R29.4 of type {4,32} Reflexible Genus 29 map R29.4* of type {32,4} Reflexible Group <256,412> Number of orientably-regular maps = 2 Genus 45 map R45.19 of type {8,32} Reflexible Genus 45 map R45.19* of type {32,8} Reflexible Group <256,432> Number of orientably-regular maps = 2 Genus 45 map R45.17 of type {8,32} Reflexible Genus 45 map R45.17* of type {32,8} Reflexible Group <256,434> Number of orientably-regular maps = 2 Genus 45 map R45.22 of type {8,32} Reflexible Genus 45 map R45.22* of type {32,8} Reflexible Group <256,435> Number of orientably-regular maps = 2 Genus 53 map R53.19 of type {16,32} Reflexible Genus 53 map R53.19* of type {32,16} Reflexible Group <256,436> Number of orientably-regular maps = 2 Genus 53 map R53.18 of type {16,32} Reflexible Genus 53 map R53.18* of type {32,16} Reflexible Group <256,500> Number of orientably-regular maps = 1 Genus 61 map R61.32 of type {64,64} Reflexible Self-dual Group <256,501> Number of orientably-regular maps = 1 Genus 61 map R61.34 of type {64,64} Reflexible Self-dual Group <256,502> Number of orientably-regular maps = 2 Genus 61 map R61.33 of type {64,64} Reflexible Non-self-dual Genus 61 map R61.33* of type {64,64} Reflexible Non-self-dual Group <256,503> Number of orientably-regular maps = 2 Genus 25 map R25.14 of type {4,16} Reflexible Genus 25 map R25.14* of type {16,4} Reflexible Group <256,505> Number of orientably-regular maps = 2 Genus 41 map R41.48 of type {8,16} Reflexible Genus 41 map R41.48* of type {16,8} Reflexible Group <256,507> Number of orientably-regular maps = 2 Genus 25 map R25.13 of type {4,16} Reflexible Genus 25 map R25.13* of type {16,4} Reflexible Group <256,509> Number of orientably-regular maps = 2 Genus 41 map R41.49 of type {8,16} Reflexible Genus 41 map R41.49* of type {16,8} Reflexible Group <256,511> Number of orientably-regular maps = 4 Genus 25 map C25.1 of type {4,16} Chiral Genus 25 map C25.1# of type {4,16} Chiral Genus 25 map C25.1* of type {16,4} Chiral Genus 25 map C25.1*# of type {16,4} Chiral Group <256,513> Number of orientably-regular maps = 4 Genus 41 map C41.19 of type {8,16} Chiral Genus 41 map C41.19# of type {8,16} Chiral Genus 41 map C41.19* of type {16,8} Chiral Genus 41 map C41.19*# of type {16,8} Chiral Group <256,515> Number of orientably-regular maps = 2 Genus 17 map R17.9 of type {4,8} Reflexible Genus 17 map R17.9* of type {8,4} Reflexible Group <256,517> Number of orientably-regular maps = 1 Genus 1 map R1.25 of type {4,4} Reflexible Self-dual Group <256,519> Number of orientably-regular maps = 1 Genus 33 map R33.48 of type {8,8} Reflexible Self-dual Group <256,525> Number of orientably-regular maps = 2 Genus 31 map R31.8 of type {4,64} Reflexible Genus 31 map R31.8* of type {64,4} Reflexible Group <256,527> Number of orientably-regular maps = 2 Genus 47 map R47.8 of type {8,64} Reflexible Genus 47 map R47.8* of type {64,8} Reflexible Group <256,528> Number of orientably-regular maps = 2 Genus 31 map R31.9 of type {4,64} Reflexible Genus 31 map R31.9* of type {64,4} Reflexible Group <256,529> Number of orientably-regular maps = 2 Genus 47 map R47.7 of type {8,64} Reflexible Genus 47 map R47.7* of type {64,8} Reflexible Group <256,537> Number of orientably-regular maps = 1 Genus 63 map R63.25 of type {128,128} Reflexible Self-dual Group <256,538> Number of orientably-regular maps = 1 Genus 63 map R63.24 of type {128,128} Reflexible Self-dual Group <256,539> Number of orientably-regular maps = 2 Genus 0 map R0.127 of type {2,128} Reflexible Genus 0 map R0.127* of type {128,2} Reflexible Group <256,540> Number of orientably-regular maps = 2 Genus 32 map R32.2 of type {4,128} Reflexible Genus 32 map R32.2* of type {128,4} Reflexible ............................................................................... Groups of order 258 Total = 6 Group <258,1> Number of orientably-regular maps = 4 Genus 1 map C1.9 of type {3,6} Chiral Genus 1 map C1.9# of type {3,6} Chiral Genus 1 map C1.9* of type {6,3} Chiral Genus 1 map C1.9*# of type {6,3} Chiral Group <258,3> Number of orientably-regular maps = 2 Genus 63 map R63.22 of type {86,129} Reflexible Genus 63 map R63.22* of type {129,86} Reflexible Group <258,4> Number of orientably-regular maps = 2 Genus 43 map R43.13 of type {6,129} Reflexible Genus 43 map R43.13* of type {129,6} Reflexible Group <258,5> Number of orientably-regular maps = 2 Genus 0 map R0.128 of type {2,129} Reflexible Genus 0 map R0.128* of type {129,2} Reflexible Group <258,6> Number of orientably-regular maps = 2 Genus 64 map R64.41 of type {129,258} Reflexible Genus 64 map R64.41* of type {258,129} Reflexible ............................................................................... Groups of order 260 Total = 15 Group <260,4> Number of orientably-regular maps = 1 Genus 65 map R65.142 of type {260,260} Reflexible Self-dual Group <260,5> Number of orientably-regular maps = 2 Genus 53 map C53.13 of type {20,20} Chiral Self-dual Genus 53 map C53.13# of type {20,20} Chiral Self-dual Group <260,7> Number of orientably-regular maps = 2 Genus 61 map C61.17 of type {52,52} Chiral Self-dual Genus 61 map C61.17# of type {52,52} Chiral Self-dual Group <260,9> Number of orientably-regular maps = 2 Genus 1 map C1.34 of type {4,4} Chiral Self-dual Genus 1 map C1.34# of type {4,4} Chiral Self-dual Group <260,10> Number of orientably-regular maps = 2 Genus 1 map C1.33 of type {4,4} Chiral Self-dual Genus 1 map C1.33# of type {4,4} Chiral Self-dual Group <260,11> Number of orientably-regular maps = 2 Genus 48 map R48.6 of type {10,26} Reflexible Genus 48 map R48.6* of type {26,10} Reflexible Group <260,12> Number of orientably-regular maps = 2 Genus 52 map R52.10 of type {10,130} Reflexible Genus 52 map R52.10* of type {130,10} Reflexible Group <260,13> Number of orientably-regular maps = 2 Genus 60 map R60.13 of type {26,130} Reflexible Genus 60 map R60.13* of type {130,26} Reflexible Group <260,14> Number of orientably-regular maps = 2 Genus 0 map R0.129 of type {2,130} Reflexible Genus 0 map R0.129* of type {130,2} Reflexible Group <260,15> Number of orientably-regular maps = 1 Genus 64 map R64.42 of type {130,130} Reflexible Self-dual ............................................................................... Groups of order 262 Total = 2 Group <262,1> Number of orientably-regular maps = 2 Genus 0 map R0.130 of type {2,131} Reflexible Genus 0 map R0.130* of type {131,2} Reflexible Group <262,2> Number of orientably-regular maps = 2 Genus 65 map R65.140 of type {131,262} Reflexible Genus 65 map R65.140* of type {262,131} Reflexible ............................................................................... Groups of order 264 Total = 39 Group <264,4> Number of orientably-regular maps = 1 Genus 66 map R66.23 of type {264,264} Reflexible Self-dual Group <264,7> Number of orientably-regular maps = 2 Genus 53 map R53.15 of type {12,44} Reflexible Genus 53 map R53.15* of type {44,12} Reflexible Group <264,9> Number of orientably-regular maps = 2 Genus 42 map R42.4 of type {6,44} Reflexible Genus 42 map R42.4* of type {44,6} Reflexible Group <264,10> Number of orientably-regular maps = 2 Genus 50 map R50.9 of type {12,22} Reflexible Genus 50 map R50.9* of type {22,12} Reflexible Group <264,14> Number of orientably-regular maps = 2 Genus 55 map R55.44 of type {12,132} Reflexible Genus 55 map R55.44* of type {132,12} Reflexible Group <264,15> Number of orientably-regular maps = 2 Genus 44 map R44.4 of type {6,132} Reflexible Genus 44 map R44.4* of type {132,6} Reflexible Group <264,17> Number of orientably-regular maps = 2 Genus 54 map R54.7 of type {12,66} Reflexible Genus 54 map R54.7* of type {66,12} Reflexible Group <264,19> Number of orientably-regular maps = 2 Genus 63 map R63.20 of type {44,132} Reflexible Genus 63 map R63.20* of type {132,44} Reflexible Group <264,20> Number of orientably-regular maps = 2 Genus 60 map R60.12 of type {22,132} Reflexible Genus 60 map R60.12* of type {132,22} Reflexible Group <264,22> Number of orientably-regular maps = 2 Genus 62 map R62.8 of type {44,66} Reflexible Genus 62 map R62.8* of type {66,44} Reflexible Group <264,24> Number of orientably-regular maps = 2 Genus 33 map R33.30 of type {4,132} Reflexible Genus 33 map R33.30* of type {132,4} Reflexible Group <264,25> Number of orientably-regular maps = 2 Genus 0 map R0.131 of type {2,132} Reflexible Genus 0 map R0.131* of type {132,2} Reflexible Group <264,27> Number of orientably-regular maps = 2 Genus 32 map R32.1 of type {4,66} Reflexible Genus 32 map R32.1* of type {66,4} Reflexible Group <264,28> Number of orientably-regular maps = 1 Genus 65 map R65.141 of type {132,132} Reflexible Self-dual Group <264,29> Number of orientably-regular maps = 2 Genus 64 map R64.40 of type {66,132} Reflexible Genus 64 map R64.40* of type {132,66} Reflexible Group <264,31> Number of orientably-regular maps = 2 Genus 60 map R60.14 of type {33,44} Reflexible Genus 60 map R60.14* of type {44,33} Reflexible Group <264,32> Number of orientably-regular maps = 2 Genus 30 map R30.1 of type {4,33} Reflexible Genus 30 map R30.1* of type {33,4} Reflexible Group <264,33> Number of orientably-regular maps = 2 Genus 41 map R41.34 of type {6,33} Reflexible Genus 41 map R41.34* of type {33,6} Reflexible Group <264,35> Number of orientably-regular maps = 3 Genus 61 map R61.31 of type {33,66} Reflexible Genus 61 map R61.31* of type {66,33} Reflexible Genus 63 map R63.21 of type {66,66} Reflexible Self-dual ............................................................................... Groups of order 266 Total = 4 Group <266,1> Number of orientably-regular maps = 2 Genus 63 map R63.19 of type {38,133} Reflexible Genus 63 map R63.19* of type {133,38} Reflexible Group <266,2> Number of orientably-regular maps = 2 Genus 57 map R57.54 of type {14,133} Reflexible Genus 57 map R57.54* of type {133,14} Reflexible Group <266,3> Number of orientably-regular maps = 2 Genus 0 map R0.132 of type {2,133} Reflexible Genus 0 map R0.132* of type {133,2} Reflexible Group <266,4> Number of orientably-regular maps = 2 Genus 66 map R66.21 of type {133,266} Reflexible Genus 66 map R66.21* of type {266,133} Reflexible ............................................................................... Groups of order 268 Total = 4 Group <268,2> Number of orientably-regular maps = 1 Genus 67 map R67.24 of type {268,268} Reflexible Self-dual Group <268,3> Number of orientably-regular maps = 2 Genus 0 map R0.133 of type {2,134} Reflexible Genus 0 map R0.133* of type {134,2} Reflexible Group <268,4> Number of orientably-regular maps = 1 Genus 66 map R66.22 of type {134,134} Reflexible Self-dual ............................................................................... Groups of order 270 Total = 30 Group <270,1> Number of orientably-regular maps = 2 Genus 54 map R54.6 of type {10,135} Reflexible Genus 54 map R54.6* of type {135,10} Reflexible Group <270,2> Number of orientably-regular maps = 2 Genus 65 map R65.138 of type {54,135} Reflexible Genus 65 map R65.138* of type {135,54} Reflexible Group <270,3> Number of orientably-regular maps = 2 Genus 0 map R0.134 of type {2,135} Reflexible Genus 0 map R0.134* of type {135,2} Reflexible Group <270,4> Number of orientably-regular maps = 2 Genus 67 map R67.21 of type {135,270} Reflexible Genus 67 map R67.21* of type {270,135} Reflexible Group <270,8> Number of orientably-regular maps = 2 Genus 61 map R61.30 of type {30,45} Reflexible Genus 61 map R61.30* of type {45,30} Reflexible Group <270,9> Number of orientably-regular maps = 2 Genus 64 map R64.39 of type {45,90} Reflexible Genus 64 map R64.39* of type {90,45} Reflexible Group <270,10> Number of orientably-regular maps = 2 Genus 55 map R55.45 of type {15,30} Reflexible Genus 55 map R55.45* of type {30,15} Reflexible Group <270,11> Number of orientably-regular maps = 4 Genus 61 map C61.16 of type {30,45} Chiral Genus 61 map C61.16# of type {30,45} Chiral Genus 61 map C61.16* of type {45,30} Chiral Genus 61 map C61.16*# of type {45,30} Chiral Group <270,12> Number of orientably-regular maps = 2 Genus 43 map R43.12 of type {6,45} Reflexible Genus 43 map R43.12* of type {45,6} Reflexible Group <270,13> Number of orientably-regular maps = 2 Genus 58 map R58.12 of type {18,45} Reflexible Genus 58 map R58.12* of type {45,18} Reflexible Group <270,14> Number of orientably-regular maps = 2 Genus 37 map R37.31 of type {6,15} Reflexible Genus 37 map R37.31* of type {15,6} Reflexible Group <270,15> Number of orientably-regular maps = 4 Genus 43 map C43.8 of type {6,45} Chiral Genus 43 map C43.8# of type {6,45} Chiral Genus 43 map C43.8* of type {45,6} Chiral Genus 43 map C43.8*# of type {45,6} Chiral ............................................................................... Groups of order 272 Total = 54 Group <272,2> Number of orientably-regular maps = 1 Genus 68 map R68.15 of type {272,272} Reflexible Self-dual Group <272,4> Number of orientably-regular maps = 2 Genus 51 map R51.22 of type {8,136} Reflexible Genus 51 map R51.22* of type {136,8} Reflexible Group <272,5> Number of orientably-regular maps = 2 Genus 51 map R51.23 of type {8,136} Reflexible Genus 51 map R51.23* of type {136,8} Reflexible Group <272,6> Number of orientably-regular maps = 2 Genus 34 map R34.5 of type {4,136} Reflexible Genus 34 map R34.5* of type {136,4} Reflexible Group <272,7> Number of orientably-regular maps = 2 Genus 0 map R0.135 of type {2,136} Reflexible Genus 0 map R0.135* of type {136,2} Reflexible Group <272,14> Number of orientably-regular maps = 2 Genus 33 map R33.29 of type {4,68} Reflexible Genus 33 map R33.29* of type {68,4} Reflexible Group <272,15> Number of orientably-regular maps = 2 Genus 48 map R48.5 of type {8,34} Reflexible Genus 48 map R48.5* of type {34,8} Reflexible Group <272,17> Number of orientably-regular maps = 2 Genus 50 map R50.8 of type {8,68} Reflexible Genus 50 map R50.8* of type {68,8} Reflexible Group <272,21> Number of orientably-regular maps = 1 Genus 65 map R65.139 of type {68,68} Reflexible Self-dual Group <272,23> Number of orientably-regular maps = 1 Genus 67 map R67.23 of type {136,136} Reflexible Self-dual Group <272,24> Number of orientably-regular maps = 1 Genus 67 map R67.22 of type {136,136} Reflexible Self-dual Group <272,25> Number of orientably-regular maps = 2 Genus 64 map R64.38 of type {34,136} Reflexible Genus 64 map R64.38* of type {136,34} Reflexible Group <272,26> Number of orientably-regular maps = 2 Genus 66 map R66.19 of type {68,136} Reflexible Genus 66 map R66.19* of type {136,68} Reflexible Group <272,29> Number of orientably-regular maps = 2 Genus 35 map C35.4 of type {8,8} Chiral Self-dual Genus 35 map C35.4# of type {8,8} Chiral Self-dual Group <272,30> Number of orientably-regular maps = 2 Genus 35 map C35.6 of type {8,8} Chiral Self-dual Genus 35 map C35.6# of type {8,8} Chiral Self-dual Group <272,35> Number of orientably-regular maps = 2 Genus 1 map C1.35 of type {4,4} Chiral Self-dual Genus 1 map C1.35# of type {4,4} Chiral Self-dual Group <272,50> Number of orientably-regular maps = 8 Genus 52 map C52.2 of type {16,16} Chiral Non-SD Non-MSD Genus 52 map C52.2# of type {16,16} Chiral Non-SD Non-MSD Genus 52 map C52.2* of type {16,16} Chiral Non-SD Non-MSD Genus 52 map C52.2*# of type {16,16} Chiral Non-SD Non-MSD Genus 52 map C52.3 of type {16,16} Chiral Non-SD Non-MSD Genus 52 map C52.3# of type {16,16} Chiral Non-SD Non-MSD Genus 52 map C52.3* of type {16,16} Chiral Non-SD Non-MSD Genus 52 map C52.3*# of type {16,16} Chiral Non-SD Non-MSD Group <272,51> Number of orientably-regular maps = 4 Genus 35 map C35.5 of type {8,8} Chiral Non-SD Non-MSD Genus 35 map C35.5# of type {8,8} Chiral Non-SD Non-MSD Genus 35 map C35.5* of type {8,8} Chiral Non-SD Non-MSD Genus 35 map C35.5*# of type {8,8} Chiral Non-SD Non-MSD ............................................................................... Groups of order 274 Total = 2 Group <274,1> Number of orientably-regular maps = 2 Genus 0 map R0.136 of type {2,137} Reflexible Genus 0 map R0.136* of type {137,2} Reflexible Group <274,2> Number of orientably-regular maps = 2 Genus 68 map R68.13 of type {137,274} Reflexible Genus 68 map R68.13* of type {274,137} Reflexible ............................................................................... Groups of order 276 Total = 10 Group <276,4> Number of orientably-regular maps = 1 Genus 69 map R69.52 of type {276,276} Reflexible Self-dual Group <276,5> Number of orientably-regular maps = 2 Genus 44 map R44.3 of type {6,46} Reflexible Genus 44 map R44.3* of type {46,6} Reflexible Group <276,6> Number of orientably-regular maps = 1 Genus 66 map R66.20 of type {69,69} Reflexible Self-dual Group <276,7> Number of orientably-regular maps = 2 Genus 46 map R46.26 of type {6,138} Reflexible Genus 46 map R46.26* of type {138,6} Reflexible Group <276,8> Number of orientably-regular maps = 2 Genus 66 map R66.18 of type {46,138} Reflexible Genus 66 map R66.18* of type {138,46} Reflexible Group <276,9> Number of orientably-regular maps = 2 Genus 0 map R0.137 of type {2,138} Reflexible Genus 0 map R0.137* of type {138,2} Reflexible Group <276,10> Number of orientably-regular maps = 1 Genus 68 map R68.14 of type {138,138} Reflexible Self-dual ............................................................................... Groups of order 278 Total = 2 Group <278,1> Number of orientably-regular maps = 2 Genus 0 map R0.138 of type {2,139} Reflexible Genus 0 map R0.138* of type {139,2} Reflexible Group <278,2> Number of orientably-regular maps = 2 Genus 69 map R69.50 of type {139,278} Reflexible Genus 69 map R69.50* of type {278,139} Reflexible ............................................................................... Groups of order 280 Total = 40 Group <280,4> Number of orientably-regular maps = 1 Genus 70 map R70.17 of type {280,280} Reflexible Self-dual Group <280,9> Number of orientably-regular maps = 2 Genus 59 map R59.7 of type {20,28} Reflexible Genus 59 map R59.7* of type {28,20} Reflexible Group <280,11> Number of orientably-regular maps = 2 Genus 52 map R52.9 of type {10,28} Reflexible Genus 52 map R52.9* of type {28,10} Reflexible Group <280,12> Number of orientably-regular maps = 2 Genus 54 map R54.8 of type {14,20} Reflexible Genus 54 map R54.8* of type {20,14} Reflexible Group <280,15> Number of orientably-regular maps = 2 Genus 63 map R63.18 of type {20,140} Reflexible Genus 63 map R63.18* of type {140,20} Reflexible Group <280,16> Number of orientably-regular maps = 2 Genus 56 map R56.15 of type {10,140} Reflexible Genus 56 map R56.15* of type {140,10} Reflexible Group <280,18> Number of orientably-regular maps = 2 Genus 62 map R62.7 of type {20,70} Reflexible Genus 62 map R62.7* of type {70,20} Reflexible Group <280,20> Number of orientably-regular maps = 2 Genus 65 map R65.134 of type {28,140} Reflexible Genus 65 map R65.134* of type {140,28} Reflexible Group <280,21> Number of orientably-regular maps = 2 Genus 60 map R60.10 of type {14,140} Reflexible Genus 60 map R60.10* of type {140,14} Reflexible Group <280,23> Number of orientably-regular maps = 2 Genus 64 map R64.37 of type {28,70} Reflexible Genus 64 map R64.37* of type {70,28} Reflexible Group <280,25> Number of orientably-regular maps = 2 Genus 35 map R35.3 of type {4,140} Reflexible Genus 35 map R35.3* of type {140,4} Reflexible Group <280,26> Number of orientably-regular maps = 2 Genus 0 map R0.139 of type {2,140} Reflexible Genus 0 map R0.139* of type {140,2} Reflexible Group <280,28> Number of orientably-regular maps = 2 Genus 34 map R34.4 of type {4,70} Reflexible Genus 34 map R34.4* of type {70,4} Reflexible Group <280,29> Number of orientably-regular maps = 1 Genus 69 map R69.51 of type {140,140} Reflexible Self-dual Group <280,30> Number of orientably-regular maps = 2 Genus 68 map R68.12 of type {70,140} Reflexible Genus 68 map R68.12* of type {140,70} Reflexible Group <280,32> Number of orientably-regular maps = 4 Genus 31 map C31.3 of type {4,28} Chiral Genus 31 map C31.3# of type {4,28} Chiral Genus 31 map C31.3* of type {28,4} Chiral Genus 31 map C31.3*# of type {28,4} Chiral Group <280,33> Number of orientably-regular maps = 2 Genus 63 map C63.2 of type {35,35} Chiral Mirror-self-dual Genus 63 map C63.2# of type {35,35} Chiral Mirror-self-dual Group <280,34> Number of orientably-regular maps = 2 Genus 61 map C61.15 of type {28,28} Chiral Self-dual Genus 61 map C61.15# of type {28,28} Chiral Self-dual ............................................................................... Groups of order 282 Total = 4 Group <282,1> Number of orientably-regular maps = 2 Genus 69 map R69.49 of type {94,141} Reflexible Genus 69 map R69.49* of type {141,94} Reflexible Group <282,2> Number of orientably-regular maps = 2 Genus 47 map R47.4 of type {6,141} Reflexible Genus 47 map R47.4* of type {141,6} Reflexible Group <282,3> Number of orientably-regular maps = 2 Genus 0 map R0.140 of type {2,141} Reflexible Genus 0 map R0.140* of type {141,2} Reflexible Group <282,4> Number of orientably-regular maps = 2 Genus 70 map R70.15 of type {141,282} Reflexible Genus 70 map R70.15* of type {282,141} Reflexible ............................................................................... Groups of order 284 Total = 4 Group <284,2> Number of orientably-regular maps = 1 Genus 71 map R71.21 of type {284,284} Reflexible Self-dual Group <284,3> Number of orientably-regular maps = 2 Genus 0 map R0.141 of type {2,142} Reflexible Genus 0 map R0.141* of type {142,2} Reflexible Group <284,4> Number of orientably-regular maps = 1 Genus 70 map R70.16 of type {142,142} Reflexible Self-dual ............................................................................... Groups of order 286 Total = 4 Group <286,1> Number of orientably-regular maps = 2 Genus 66 map R66.15 of type {26,143} Reflexible Genus 66 map R66.15* of type {143,26} Reflexible Group <286,2> Number of orientably-regular maps = 2 Genus 65 map R65.133 of type {22,143} Reflexible Genus 65 map R65.133* of type {143,22} Reflexible Group <286,3> Number of orientably-regular maps = 2 Genus 0 map R0.142 of type {2,143} Reflexible Genus 0 map R0.142* of type {143,2} Reflexible Group <286,4> Number of orientably-regular maps = 2 Genus 71 map R71.18 of type {143,286} Reflexible Genus 71 map R71.18* of type {286,143} Reflexible ............................................................................... Groups of order 288 Total = 1045 Group <288,2> Number of orientably-regular maps = 1 Genus 72 map R72.23 of type {288,288} Reflexible Self-dual Group <288,4> Number of orientably-regular maps = 2 Genus 63 map R63.16 of type {16,144} Reflexible Genus 63 map R63.16* of type {144,16} Reflexible Group <288,5> Number of orientably-regular maps = 2 Genus 63 map R63.17 of type {16,144} Reflexible Genus 63 map R63.17* of type {144,16} Reflexible Group <288,6> Number of orientably-regular maps = 2 Genus 0 map R0.143 of type {2,144} Reflexible Genus 0 map R0.143* of type {144,2} Reflexible Group <288,7> Number of orientably-regular maps = 2 Genus 36 map R36.7 of type {4,144} Reflexible Genus 36 map R36.7* of type {144,4} Reflexible Group <288,12> Number of orientably-regular maps = 2 Genus 51 map R51.21 of type {8,36} Reflexible Genus 51 map R51.21* of type {36,8} Reflexible Group <288,13> Number of orientably-regular maps = 2 Genus 33 map R33.28 of type {4,36} Reflexible Genus 33 map R33.28* of type {36,4} Reflexible Group <288,17> Number of orientably-regular maps = 2 Genus 51 map R51.20 of type {8,36} Reflexible Genus 51 map R51.20* of type {36,8} Reflexible Group <288,27> Number of orientably-regular maps = 2 Genus 53 map R53.14 of type {8,72} Reflexible Genus 53 map R53.14* of type {72,8} Reflexible Group <288,28> Number of orientably-regular maps = 2 Genus 35 map R35.1 of type {4,72} Reflexible Genus 35 map R35.1* of type {72,4} Reflexible Group <288,31> Number of orientably-regular maps = 2 Genus 53 map R53.13 of type {8,72} Reflexible Genus 53 map R53.13* of type {72,8} Reflexible Group <288,32> Number of orientably-regular maps = 2 Genus 35 map R35.2 of type {4,72} Reflexible Genus 35 map R35.2* of type {72,4} Reflexible Group <288,33> Number of orientably-regular maps = 2 Genus 56 map R56.16 of type {16,18} Reflexible Genus 56 map R56.16* of type {18,16} Reflexible Group <288,35> Number of orientably-regular maps = 2 Genus 60 map R60.11 of type {16,36} Reflexible Genus 60 map R60.11* of type {36,16} Reflexible Group <288,48> Number of orientably-regular maps = 1 Genus 69 map R69.47 of type {72,72} Reflexible Self-dual Group <288,49> Number of orientably-regular maps = 1 Genus 65 map R65.137 of type {36,36} Reflexible Self-dual Group <288,50> Number of orientably-regular maps = 1 Genus 69 map R69.48 of type {72,72} Reflexible Self-dual Group <288,52> Number of orientably-regular maps = 2 Genus 67 map R67.15 of type {36,72} Reflexible Genus 67 map R67.15* of type {72,36} Reflexible Group <288,54> Number of orientably-regular maps = 2 Genus 67 map R67.16 of type {36,72} Reflexible Genus 67 map R67.16* of type {72,36} Reflexible Group <288,59> Number of orientably-regular maps = 1 Genus 71 map R71.20 of type {144,144} Reflexible Self-dual Group <288,60> Number of orientably-regular maps = 1 Genus 71 map R71.19 of type {144,144} Reflexible Self-dual Group <288,61> Number of orientably-regular maps = 2 Genus 64 map R64.35 of type {18,144} Reflexible Genus 64 map R64.35* of type {144,18} Reflexible Group <288,62> Number of orientably-regular maps = 2 Genus 68 map R68.11 of type {36,144} Reflexible Genus 68 map R68.11* of type {144,36} Reflexible Group <288,67> Number of orientably-regular maps = 2 Genus 39 map R39.5 of type {8,9} Reflexible Genus 39 map R39.5* of type {9,8} Reflexible Group <288,73> Number of orientably-regular maps = 1 Genus 57 map R57.56 of type {18,18} Reflexible Self-dual Group <288,75> Number of orientably-regular maps = 2 Genus 49 map R49.61 of type {9,18} Reflexible Genus 49 map R49.61* of type {18,9} Reflexible Group <288,76> Number of orientably-regular maps = 2 Genus 69 map R69.45 of type {72,72} Reflexible Self-dual Genus 69 map R69.46 of type {72,72} Reflexible Self-dual Group <288,77> Number of orientably-regular maps = 2 Genus 69 map R69.43 of type {72,72} Reflexible Self-dual Genus 69 map R69.44 of type {72,72} Reflexible Self-dual Group <288,190> Number of orientably-regular maps = 1 Genus 67 map R67.19 of type {48,48} Reflexible Self-dual Group <288,192> Number of orientably-regular maps = 1 Genus 67 map R67.20 of type {48,48} Reflexible Self-dual Group <288,194> Number of orientably-regular maps = 2 Genus 46 map R46.25 of type {6,48} Reflexible Genus 46 map R46.25* of type {48,6} Reflexible Group <288,197> Number of orientably-regular maps = 2 Genus 58 map R58.11 of type {12,48} Reflexible Genus 58 map R58.11* of type {48,12} Reflexible Group <288,205> Number of orientably-regular maps = 1 Genus 61 map R61.29 of type {24,24} Reflexible Self-dual Group <288,207> Number of orientably-regular maps = 1 Genus 61 map R61.28 of type {24,24} Reflexible Self-dual Group <288,212> Number of orientably-regular maps = 2 Genus 55 map R55.42 of type {12,24} Reflexible Genus 55 map R55.42* of type {24,12} Reflexible Group <288,218> Number of orientably-regular maps = 2 Genus 55 map R55.43 of type {12,24} Reflexible Genus 55 map R55.43* of type {24,12} Reflexible Group <288,229> Number of orientably-regular maps = 1 Genus 49 map R49.73 of type {12,12} Reflexible Self-dual Group <288,231> Number of orientably-regular maps = 2 Genus 67 map R67.17 of type {48,48} Reflexible Non-self-dual Genus 67 map R67.17* of type {48,48} Reflexible Non-self-dual Group <288,232> Number of orientably-regular maps = 2 Genus 67 map R67.18 of type {48,48} Reflexible Non-self-dual Genus 67 map R67.18* of type {48,48} Reflexible Non-self-dual Group <288,233> Number of orientably-regular maps = 2 Genus 46 map R46.24 of type {6,48} Reflexible Genus 46 map R46.24* of type {48,6} Reflexible Group <288,234> Number of orientably-regular maps = 2 Genus 58 map R58.10 of type {12,48} Reflexible Genus 58 map R58.10* of type {48,12} Reflexible Group <288,239> Number of orientably-regular maps = 2 Genus 55 map R55.37 of type {12,24} Reflexible Genus 55 map R55.37* of type {24,12} Reflexible Group <288,240> Number of orientably-regular maps = 2 Genus 49 map R49.70 of type {12,12} Reflexible Non-self-dual Genus 49 map R49.70* of type {12,12} Reflexible Non-self-dual Group <288,243> Number of orientably-regular maps = 2 Genus 55 map R55.36 of type {12,24} Reflexible Genus 55 map R55.36* of type {24,12} Reflexible Group <288,254> Number of orientably-regular maps = 2 Genus 61 map R61.27 of type {24,24} Reflexible Non-self-dual Genus 61 map R61.27* of type {24,24} Reflexible Non-self-dual Group <288,255> Number of orientably-regular maps = 2 Genus 55 map R55.38 of type {12,24} Reflexible Genus 55 map R55.38* of type {24,12} Reflexible Group <288,257> Number of orientably-regular maps = 2 Genus 61 map R61.26 of type {24,24} Reflexible Non-self-dual Genus 61 map R61.26* of type {24,24} Reflexible Non-self-dual Group <288,259> Number of orientably-regular maps = 2 Genus 55 map R55.39 of type {12,24} Reflexible Genus 55 map R55.39* of type {24,12} Reflexible Group <288,260> Number of orientably-regular maps = 2 Genus 46 map R46.23 of type {6,48} Reflexible Genus 46 map R46.23* of type {48,6} Reflexible Group <288,262> Number of orientably-regular maps = 2 Genus 58 map R58.9 of type {12,48} Reflexible Genus 58 map R58.9* of type {48,12} Reflexible Group <288,333> Number of orientably-regular maps = 2 Genus 33 map R33.27 of type {4,36} Reflexible Genus 33 map R33.27* of type {36,4} Reflexible Group <288,334> Number of orientably-regular maps = 2 Genus 33 map R33.26 of type {4,36} Reflexible Genus 33 map R33.26* of type {36,4} Reflexible Group <288,336> Number of orientably-regular maps = 2 Genus 47 map R47.6 of type {8,18} Reflexible Genus 47 map R47.6* of type {18,8} Reflexible Group <288,337> Number of orientably-regular maps = 2 Genus 47 map R47.5 of type {8,18} Reflexible Genus 47 map R47.5* of type {18,8} Reflexible Group <288,339> Number of orientably-regular maps = 2 Genus 51 map R51.19 of type {8,36} Reflexible Genus 51 map R51.19* of type {36,8} Reflexible Group <288,340> Number of orientably-regular maps = 2 Genus 51 map R51.18 of type {8,36} Reflexible Genus 51 map R51.18* of type {36,8} Reflexible Group <288,342> Number of orientably-regular maps = 2 Genus 29 map R29.2 of type {4,18} Reflexible Genus 29 map R29.2* of type {18,4} Reflexible Group <288,343> Number of orientably-regular maps = 1 Genus 65 map R65.135 of type {36,36} Reflexible Self-dual Group <288,344> Number of orientably-regular maps = 2 Genus 61 map R61.25 of type {18,36} Reflexible Genus 61 map R61.25* of type {36,18} Reflexible Group <288,347> Number of orientably-regular maps = 2 Genus 61 map R61.24 of type {18,36} Reflexible Genus 61 map R61.24* of type {36,18} Reflexible Group <288,348> Number of orientably-regular maps = 1 Genus 65 map R65.136 of type {36,36} Reflexible Self-dual Group <288,349> Number of orientably-regular maps = 1 Genus 57 map R57.55 of type {18,18} Reflexible Self-dual Group <288,374> Number of orientably-regular maps = 2 Genus 49 map R49.60 of type {8,24} Reflexible Genus 49 map R49.60* of type {24,8} Reflexible Group <288,375> Number of orientably-regular maps = 2 Genus 49 map R49.59 of type {8,24} Reflexible Genus 49 map R49.59* of type {24,8} Reflexible Group <288,377> Number of orientably-regular maps = 2 Genus 31 map R31.6 of type {4,24} Reflexible Genus 31 map R31.6* of type {24,4} Reflexible Group <288,379> Number of orientably-regular maps = 2 Genus 31 map R31.7 of type {4,24} Reflexible Genus 31 map R31.7* of type {24,4} Reflexible Group <288,382> Number of orientably-regular maps = 2 Genus 40 map R40.4 of type {6,16} Reflexible Genus 40 map R40.4* of type {16,6} Reflexible Group <288,383> Number of orientably-regular maps = 2 Genus 52 map R52.11 of type {12,16} Reflexible Genus 52 map R52.11* of type {16,12} Reflexible Group <288,386> Number of orientably-regular maps = 2 Genus 25 map R25.8 of type {4,12} Reflexible Genus 25 map R25.8* of type {12,4} Reflexible Group <288,387> Number of orientably-regular maps = 2 Genus 43 map R43.16 of type {8,12} Reflexible Genus 43 map R43.16* of type {12,8} Reflexible Group <288,389> Number of orientably-regular maps = 2 Genus 43 map R43.17 of type {8,12} Reflexible Genus 43 map R43.17* of type {12,8} Reflexible Group <288,397> Number of orientably-regular maps = 2 Genus 19 map R19.2 of type {3,24} Reflexible Genus 19 map R19.2* of type {24,3} Reflexible Group <288,405> Number of orientably-regular maps = 2 Genus 1 map R1.10 of type {3,6} Reflexible Genus 1 map R1.10* of type {6,3} Reflexible Group <288,412> Number of orientably-regular maps = 1 Genus 55 map R55.46 of type {16,16} Reflexible Self-dual Group <288,413> Number of orientably-regular maps = 1 Genus 55 map R55.47 of type {16,16} Reflexible Self-dual Group <288,422> Number of orientably-regular maps = 1 Genus 1 map R1.26 of type {4,4} Reflexible Self-dual Group <288,426> Number of orientably-regular maps = 1 Genus 37 map R37.35 of type {8,8} Reflexible Self-dual Group <288,430> Number of orientably-regular maps = 2 Genus 19 map R19.5 of type {4,8} Reflexible Genus 19 map R19.5* of type {8,4} Reflexible Group <288,433> Number of orientably-regular maps = 2 Genus 19 map R19.6 of type {4,8} Reflexible Genus 19 map R19.6* of type {8,4} Reflexible Group <288,436> Number of orientably-regular maps = 1 Genus 37 map R37.36 of type {8,8} Reflexible Self-dual Group <288,841> Number of orientably-regular maps = 4 Genus 19 map C19.1 of type {4,8} Chiral Genus 19 map C19.1# of type {4,8} Chiral Genus 19 map C19.1* of type {8,4} Chiral Genus 19 map C19.1*# of type {8,4} Chiral Group <288,846> Number of orientably-regular maps = 2 Genus 55 map R55.41 of type {12,24} Reflexible Genus 55 map R55.41* of type {24,12} Reflexible Group <288,847> Number of orientably-regular maps = 2 Genus 55 map R55.40 of type {12,24} Reflexible Genus 55 map R55.40* of type {24,12} Reflexible Group <288,850> Number of orientably-regular maps = 2 Genus 43 map R43.11 of type {6,24} Reflexible Genus 43 map R43.11* of type {24,6} Reflexible Group <288,851> Number of orientably-regular maps = 2 Genus 43 map R43.10 of type {6,24} Reflexible Genus 43 map R43.10* of type {24,6} Reflexible Group <288,854> Number of orientably-regular maps = 2 Genus 49 map R49.71 of type {12,12} Reflexible Non-self-dual Genus 49 map R49.71* of type {12,12} Reflexible Non-self-dual Group <288,855> Number of orientably-regular maps = 2 Genus 49 map R49.72 of type {12,12} Reflexible Non-self-dual Genus 49 map R49.72* of type {12,12} Reflexible Non-self-dual Group <288,858> Number of orientably-regular maps = 2 Genus 37 map R37.30 of type {6,12} Reflexible Genus 37 map R37.30* of type {12,6} Reflexible Group <288,861> Number of orientably-regular maps = 2 Genus 55 map C55.8 of type {16,16} Chiral Self-dual Genus 55 map C55.8# of type {16,16} Chiral Self-dual Group <288,862> Number of orientably-regular maps = 2 Genus 55 map C55.9 of type {16,16} Chiral Self-dual Genus 55 map C55.9# of type {16,16} Chiral Self-dual Group <288,867> Number of orientably-regular maps = 2 Genus 37 map C37.3 of type {8,8} Chiral Self-dual Genus 37 map C37.3# of type {8,8} Chiral Self-dual Group <288,897> Number of orientably-regular maps = 2 Genus 49 map R49.66 of type {12,12} Reflexible Non-self-dual Genus 49 map R49.66* of type {12,12} Reflexible Non-self-dual Group <288,898> Number of orientably-regular maps = 2 Genus 49 map R49.67 of type {12,12} Reflexible Non-self-dual Genus 49 map R49.67* of type {12,12} Reflexible Non-self-dual Group <288,900> Number of orientably-regular maps = 2 Genus 43 map R43.8 of type {6,24} Reflexible Genus 43 map R43.8* of type {24,6} Reflexible Group <288,901> Number of orientably-regular maps = 2 Genus 43 map R43.9 of type {6,24} Reflexible Genus 43 map R43.9* of type {24,6} Reflexible Group <288,903> Number of orientably-regular maps = 2 Genus 55 map R55.34 of type {12,24} Reflexible Genus 55 map R55.34* of type {24,12} Reflexible Group <288,904> Number of orientably-regular maps = 2 Genus 55 map R55.35 of type {12,24} Reflexible Genus 55 map R55.35* of type {24,12} Reflexible Group <288,906> Number of orientably-regular maps = 2 Genus 37 map R37.27 of type {6,12} Reflexible Genus 37 map R37.27* of type {12,6} Reflexible Group <288,919> Number of orientably-regular maps = 2 Genus 49 map R49.69 of type {12,12} Reflexible Non-self-dual Genus 49 map R49.69* of type {12,12} Reflexible Non-self-dual Group <288,920> Number of orientably-regular maps = 2 Genus 37 map R37.29 of type {6,12} Reflexible Genus 37 map R37.29* of type {12,6} Reflexible Group <288,921> Number of orientably-regular maps = 2 Genus 37 map R37.25 of type {6,12} Reflexible Genus 37 map R37.25* of type {12,6} Reflexible Group <288,923> Number of orientably-regular maps = 2 Genus 25 map R25.19 of type {6,6} Reflexible Non-self-dual Genus 25 map R25.19* of type {6,6} Reflexible Non-self-dual Group <288,924> Number of orientably-regular maps = 2 Genus 49 map R49.68 of type {12,12} Reflexible Non-self-dual Genus 49 map R49.68* of type {12,12} Reflexible Non-self-dual Group <288,925> Number of orientably-regular maps = 2 Genus 37 map R37.28 of type {6,12} Reflexible Genus 37 map R37.28* of type {12,6} Reflexible Group <288,928> Number of orientably-regular maps = 2 Genus 37 map R37.26 of type {6,12} Reflexible Genus 37 map R37.26* of type {12,6} Reflexible Group <288,1024> Number of orientably-regular maps = 2 Genus 13 map R13.2 of type {3,12} Reflexible Genus 13 map R13.2* of type {12,3} Reflexible Group <288,1025> Number of orientably-regular maps = 2 Genus 25 map R25.18 of type {6,6} Reflexible Non-self-dual Genus 25 map R25.18* of type {6,6} Reflexible Non-self-dual ............................................................................... Groups of order 290 Total = 4 Group <290,1> Number of orientably-regular maps = 2 Genus 70 map R70.14 of type {58,145} Reflexible Genus 70 map R70.14* of type {145,58} Reflexible Group <290,2> Number of orientably-regular maps = 2 Genus 58 map R58.8 of type {10,145} Reflexible Genus 58 map R58.8* of type {145,10} Reflexible Group <290,3> Number of orientably-regular maps = 2 Genus 0 map R0.144 of type {2,145} Reflexible Genus 0 map R0.144* of type {145,2} Reflexible Group <290,4> Number of orientably-regular maps = 2 Genus 72 map R72.21 of type {145,290} Reflexible Genus 72 map R72.21* of type {290,145} Reflexible ............................................................................... Groups of order 292 Total = 5 Group <292,2> Number of orientably-regular maps = 1 Genus 73 map R73.120 of type {292,292} Reflexible Self-dual Group <292,3> Number of orientably-regular maps = 2 Genus 1 map C1.36 of type {4,4} Chiral Self-dual Genus 1 map C1.36# of type {4,4} Chiral Self-dual Group <292,4> Number of orientably-regular maps = 2 Genus 0 map R0.145 of type {2,146} Reflexible Genus 0 map R0.145* of type {146,2} Reflexible Group <292,5> Number of orientably-regular maps = 1 Genus 72 map R72.22 of type {146,146} Reflexible Self-dual ............................................................................... Groups of order 294 Total = 23 Group <294,1> Number of orientably-regular maps = 4 Genus 1 map C1.10 of type {3,6} Chiral Genus 1 map C1.10# of type {3,6} Chiral Genus 1 map C1.10* of type {6,3} Chiral Genus 1 map C1.10*# of type {6,3} Chiral Group <294,3> Number of orientably-regular maps = 2 Genus 72 map R72.20 of type {98,147} Reflexible Genus 72 map R72.20* of type {147,98} Reflexible Group <294,4> Number of orientably-regular maps = 2 Genus 49 map R49.56 of type {6,147} Reflexible Genus 49 map R49.56* of type {147,6} Reflexible Group <294,5> Number of orientably-regular maps = 2 Genus 0 map R0.146 of type {2,147} Reflexible Genus 0 map R0.146* of type {147,2} Reflexible Group <294,6> Number of orientably-regular maps = 2 Genus 73 map R73.118 of type {147,294} Reflexible Genus 73 map R73.118* of type {294,147} Reflexible Group <294,7> Number of orientably-regular maps = 2 Genus 15 map R15.2 of type {3,14} Reflexible Genus 15 map R15.2* of type {14,3} Reflexible Group <294,8> Number of orientably-regular maps = 4 Genus 64 map C64.20 of type {21,42} Chiral Genus 64 map C64.20# of type {21,42} Chiral Genus 64 map C64.20* of type {42,21} Chiral Genus 64 map C64.20*# of type {42,21} Chiral Group <294,10> Number of orientably-regular maps = 4 Genus 43 map C43.7 of type {6,21} Chiral Genus 43 map C43.7# of type {6,21} Chiral Genus 43 map C43.7* of type {21,6} Chiral Genus 43 map C43.7*# of type {21,6} Chiral Group <294,14> Number of orientably-regular maps = 2 Genus 1 map R1.11 of type {3,6} Reflexible Genus 1 map R1.11* of type {6,3} Reflexible Group <294,18> Number of orientably-regular maps = 2 Genus 64 map R64.36 of type {21,42} Reflexible Genus 64 map R64.36* of type {42,21} Reflexible Group <294,21> Number of orientably-regular maps = 2 Genus 57 map R57.53 of type {14,21} Reflexible Genus 57 map R57.53* of type {21,14} Reflexible ............................................................................... Groups of order 296 Total = 14 Group <296,2> Number of orientably-regular maps = 1 Genus 74 map R74.15 of type {296,296} Reflexible Self-dual Group <296,5> Number of orientably-regular maps = 2 Genus 37 map R37.22 of type {4,148} Reflexible Genus 37 map R37.22* of type {148,4} Reflexible Group <296,6> Number of orientably-regular maps = 2 Genus 0 map R0.147 of type {2,148} Reflexible Genus 0 map R0.147* of type {148,2} Reflexible Group <296,8> Number of orientably-regular maps = 2 Genus 36 map R36.6 of type {4,74} Reflexible Genus 36 map R36.6* of type {74,4} Reflexible Group <296,9> Number of orientably-regular maps = 1 Genus 73 map R73.119 of type {148,148} Reflexible Self-dual Group <296,10> Number of orientably-regular maps = 2 Genus 72 map R72.18 of type {74,148} Reflexible Genus 72 map R72.18* of type {148,74} Reflexible Group <296,12> Number of orientably-regular maps = 2 Genus 1 map C1.37 of type {4,4} Chiral Self-dual Genus 1 map C1.37# of type {4,4} Chiral Self-dual ............................................................................... Groups of order 298 Total = 2 Group <298,1> Number of orientably-regular maps = 2 Genus 0 map R0.148 of type {2,149} Reflexible Genus 0 map R0.148* of type {149,2} Reflexible Group <298,2> Number of orientably-regular maps = 2 Genus 74 map R74.13 of type {149,298} Reflexible Genus 74 map R74.13* of type {298,149} Reflexible ............................................................................... Groups of order 300 Total = 49 Group <300,4> Number of orientably-regular maps = 1 Genus 75 map R75.30 of type {300,300} Reflexible Self-dual Group <300,5> Number of orientably-regular maps = 2 Genus 51 map C51.17 of type {12,12} Chiral Self-dual Genus 51 map C51.17# of type {12,12} Chiral Self-dual Group <300,7> Number of orientably-regular maps = 2 Genus 48 map R48.4 of type {6,50} Reflexible Genus 48 map R48.4* of type {50,6} Reflexible Group <300,8> Number of orientably-regular maps = 1 Genus 72 map R72.19 of type {75,75} Reflexible Self-dual Group <300,9> Number of orientably-regular maps = 2 Genus 50 map R50.6 of type {6,150} Reflexible Genus 50 map R50.6* of type {150,6} Reflexible Group <300,10> Number of orientably-regular maps = 2 Genus 72 map R72.17 of type {50,150} Reflexible Genus 72 map R72.17* of type {150,50} Reflexible Group <300,11> Number of orientably-regular maps = 2 Genus 0 map R0.149 of type {2,150} Reflexible Genus 0 map R0.149* of type {150,2} Reflexible Group <300,12> Number of orientably-regular maps = 1 Genus 74 map R74.14 of type {150,150} Reflexible Self-dual Group <300,22> Number of orientably-regular maps = 3 Genus 16 map R16.6 of type {5,5} Reflexible Self-dual Genus 36 map R36.8 of type {5,15} Reflexible Genus 36 map R36.8* of type {15,5} Reflexible Group <300,24> Number of orientably-regular maps = 2 Genus 51 map C51.16 of type {12,12} Chiral Self-dual Genus 51 map C51.16# of type {12,12} Chiral Self-dual Group <300,25> Number of orientably-regular maps = 2 Genus 36 map R36.12 of type {6,10} Reflexible Genus 36 map R36.12* of type {10,6} Reflexible Group <300,26> Number of orientably-regular maps = 2 Genus 36 map R36.11 of type {6,10} Reflexible Genus 36 map R36.11* of type {10,6} Reflexible Group <300,27> Number of orientably-regular maps = 2 Genus 26 map R26.6 of type {6,6} Reflexible Non-self-dual Genus 26 map R26.6* of type {6,6} Reflexible Non-self-dual Group <300,28> Number of orientably-regular maps = 2 Genus 71 map C71.13 of type {60,60} Chiral Self-dual Genus 71 map C71.13# of type {60,60} Chiral Self-dual Group <300,31> Number of orientably-regular maps = 1 Genus 51 map R51.24 of type {12,12} Reflexible Self-dual Group <300,36> Number of orientably-regular maps = 1 Genus 66 map R66.16 of type {30,30} Reflexible Self-dual Group <300,37> Number of orientably-regular maps = 2 Genus 56 map R56.14 of type {10,30} Reflexible Genus 56 map R56.14* of type {30,10} Reflexible Group <300,39> Number of orientably-regular maps = 2 Genus 56 map R56.12 of type {10,30} Reflexible Genus 56 map R56.12* of type {30,10} Reflexible Group <300,44> Number of orientably-regular maps = 2 Genus 66 map R66.17 of type {30,30} Reflexible Non-self-dual Genus 66 map R66.17* of type {30,30} Reflexible Non-self-dual Group <300,47> Number of orientably-regular maps = 2 Genus 56 map R56.13 of type {10,30} Reflexible Genus 56 map R56.13* of type {30,10} Reflexible ............................................................................... Groups of order 302 Total = 2 Group <302,1> Number of orientably-regular maps = 2 Genus 0 map R0.150 of type {2,151} Reflexible Genus 0 map R0.150* of type {151,2} Reflexible Group <302,2> Number of orientably-regular maps = 2 Genus 75 map R75.27 of type {151,302} Reflexible Genus 75 map R75.27* of type {302,151} Reflexible ............................................................................... Groups of order 304 Total = 42 Group <304,2> Number of orientably-regular maps = 1 Genus 76 map R76.35 of type {304,304} Reflexible Self-dual Group <304,3> Number of orientably-regular maps = 2 Genus 57 map R57.49 of type {8,152} Reflexible Genus 57 map R57.49* of type {152,8} Reflexible Group <304,4> Number of orientably-regular maps = 2 Genus 57 map R57.50 of type {8,152} Reflexible Genus 57 map R57.50* of type {152,8} Reflexible Group <304,5> Number of orientably-regular maps = 2 Genus 38 map R38.2 of type {4,152} Reflexible Genus 38 map R38.2* of type {152,4} Reflexible Group <304,6> Number of orientably-regular maps = 2 Genus 0 map R0.151 of type {2,152} Reflexible Genus 0 map R0.151* of type {152,2} Reflexible Group <304,13> Number of orientably-regular maps = 2 Genus 37 map R37.21 of type {4,76} Reflexible Genus 37 map R37.21* of type {76,4} Reflexible Group <304,14> Number of orientably-regular maps = 2 Genus 54 map R54.5 of type {8,38} Reflexible Genus 54 map R54.5* of type {38,8} Reflexible Group <304,16> Number of orientably-regular maps = 2 Genus 56 map R56.11 of type {8,76} Reflexible Genus 56 map R56.11* of type {76,8} Reflexible Group <304,20> Number of orientably-regular maps = 1 Genus 73 map R73.117 of type {76,76} Reflexible Self-dual Group <304,22> Number of orientably-regular maps = 1 Genus 75 map R75.29 of type {152,152} Reflexible Self-dual Group <304,23> Number of orientably-regular maps = 1 Genus 75 map R75.28 of type {152,152} Reflexible Self-dual Group <304,24> Number of orientably-regular maps = 2 Genus 72 map R72.15 of type {38,152} Reflexible Genus 72 map R72.15* of type {152,38} Reflexible Group <304,25> Number of orientably-regular maps = 2 Genus 74 map R74.12 of type {76,152} Reflexible Genus 74 map R74.12* of type {152,76} Reflexible ............................................................................... Groups of order 306 Total = 10 Group <306,1> Number of orientably-regular maps = 2 Genus 72 map R72.14 of type {34,153} Reflexible Genus 72 map R72.14* of type {153,34} Reflexible Group <306,2> Number of orientably-regular maps = 2 Genus 68 map R68.9 of type {18,153} Reflexible Genus 68 map R68.9* of type {153,18} Reflexible Group <306,3> Number of orientably-regular maps = 2 Genus 0 map R0.152 of type {2,153} Reflexible Genus 0 map R0.152* of type {153,2} Reflexible Group <306,4> Number of orientably-regular maps = 2 Genus 76 map R76.33 of type {153,306} Reflexible Genus 76 map R76.33* of type {306,153} Reflexible Group <306,6> Number of orientably-regular maps = 2 Genus 73 map R73.116 of type {51,102} Reflexible Genus 73 map R73.116* of type {102,51} Reflexible Group <306,7> Number of orientably-regular maps = 2 Genus 49 map R49.55 of type {6,51} Reflexible Genus 49 map R49.55* of type {51,6} Reflexible ............................................................................... Groups of order 308 Total = 9 Group <308,4> Number of orientably-regular maps = 1 Genus 77 map R77.45 of type {308,308} Reflexible Self-dual Group <308,5> Number of orientably-regular maps = 2 Genus 60 map R60.9 of type {14,22} Reflexible Genus 60 map R60.9* of type {22,14} Reflexible Group <308,6> Number of orientably-regular maps = 2 Genus 66 map R66.14 of type {14,154} Reflexible Genus 66 map R66.14* of type {154,14} Reflexible Group <308,7> Number of orientably-regular maps = 2 Genus 70 map R70.13 of type {22,154} Reflexible Genus 70 map R70.13* of type {154,22} Reflexible Group <308,8> Number of orientably-regular maps = 2 Genus 0 map R0.153 of type {2,154} Reflexible Genus 0 map R0.153* of type {154,2} Reflexible Group <308,9> Number of orientably-regular maps = 1 Genus 76 map R76.34 of type {154,154} Reflexible Self-dual ............................................................................... Groups of order 310 Total = 6 Group <310,1> Number of orientably-regular maps = 8 Genus 32 map C32.1 of type {5,10} Chiral Genus 32 map C32.1# of type {5,10} Chiral Genus 32 map C32.1* of type {10,5} Chiral Genus 32 map C32.1*# of type {10,5} Chiral Genus 32 map C32.2 of type {5,10} Chiral Genus 32 map C32.2# of type {5,10} Chiral Genus 32 map C32.2* of type {10,5} Chiral Genus 32 map C32.2*# of type {10,5} Chiral Group <310,3> Number of orientably-regular maps = 2 Genus 75 map R75.25 of type {62,155} Reflexible Genus 75 map R75.25* of type {155,62} Reflexible Group <310,4> Number of orientably-regular maps = 2 Genus 62 map R62.6 of type {10,155} Reflexible Genus 62 map R62.6* of type {155,10} Reflexible Group <310,5> Number of orientably-regular maps = 2 Genus 0 map R0.154 of type {2,155} Reflexible Genus 0 map R0.154* of type {155,2} Reflexible Group <310,6> Number of orientably-regular maps = 2 Genus 77 map R77.43 of type {155,310} Reflexible Genus 77 map R77.43* of type {310,155} Reflexible ............................................................................... Groups of order 312 Total = 61 Group <312,6> Number of orientably-regular maps = 1 Genus 78 map R78.24 of type {312,312} Reflexible Self-dual Group <312,9> Number of orientably-regular maps = 4 Genus 53 map C53.10 of type {12,12} Chiral Non-SD Non-MSD Genus 53 map C53.10# of type {12,12} Chiral Non-SD Non-MSD Genus 53 map C53.10* of type {12,12} Chiral Non-SD Non-MSD Genus 53 map C53.10*# of type {12,12} Chiral Non-SD Non-MSD Group <312,10> Number of orientably-regular maps = 4 Genus 40 map C40.5 of type {6,12} Chiral Genus 40 map C40.5# of type {6,12} Chiral Genus 40 map C40.5* of type {12,6} Chiral Genus 40 map C40.5*# of type {12,6} Chiral Group <312,12> Number of orientably-regular maps = 4 Genus 40 map C40.4 of type {6,12} Chiral Genus 40 map C40.4# of type {6,12} Chiral Genus 40 map C40.4* of type {12,6} Chiral Genus 40 map C40.4*# of type {12,6} Chiral Group <312,17> Number of orientably-regular maps = 2 Genus 63 map R63.13 of type {12,52} Reflexible Genus 63 map R63.13* of type {52,12} Reflexible Group <312,19> Number of orientably-regular maps = 2 Genus 50 map R50.5 of type {6,52} Reflexible Genus 50 map R50.5* of type {52,6} Reflexible Group <312,20> Number of orientably-regular maps = 2 Genus 60 map R60.8 of type {12,26} Reflexible Genus 60 map R60.8* of type {26,12} Reflexible Group <312,28> Number of orientably-regular maps = 2 Genus 65 map R65.127 of type {12,156} Reflexible Genus 65 map R65.127* of type {156,12} Reflexible Group <312,29> Number of orientably-regular maps = 2 Genus 52 map R52.8 of type {6,156} Reflexible Genus 52 map R52.8* of type {156,6} Reflexible Group <312,31> Number of orientably-regular maps = 2 Genus 64 map R64.29 of type {12,78} Reflexible Genus 64 map R64.29* of type {78,12} Reflexible Group <312,33> Number of orientably-regular maps = 2 Genus 75 map R75.24 of type {52,156} Reflexible Genus 75 map R75.24* of type {156,52} Reflexible Group <312,34> Number of orientably-regular maps = 2 Genus 72 map R72.13 of type {26,156} Reflexible Genus 72 map R72.13* of type {156,26} Reflexible Group <312,36> Number of orientably-regular maps = 2 Genus 74 map R74.11 of type {52,78} Reflexible Genus 74 map R74.11* of type {78,52} Reflexible Group <312,38> Number of orientably-regular maps = 2 Genus 39 map R39.4 of type {4,156} Reflexible Genus 39 map R39.4* of type {156,4} Reflexible Group <312,39> Number of orientably-regular maps = 2 Genus 0 map R0.155 of type {2,156} Reflexible Genus 0 map R0.155* of type {156,2} Reflexible Group <312,41> Number of orientably-regular maps = 2 Genus 38 map R38.1 of type {4,78} Reflexible Genus 38 map R38.1* of type {78,4} Reflexible Group <312,42> Number of orientably-regular maps = 1 Genus 77 map R77.44 of type {156,156} Reflexible Self-dual Group <312,43> Number of orientably-regular maps = 2 Genus 76 map R76.32 of type {78,156} Reflexible Genus 76 map R76.32* of type {156,78} Reflexible Group <312,45> Number of orientably-regular maps = 4 Genus 53 map C53.11 of type {12,12} Chiral Non-SD Non-MSD Genus 53 map C53.11# of type {12,12} Chiral Non-SD Non-MSD Genus 53 map C53.11* of type {12,12} Chiral Non-SD Non-MSD Genus 53 map C53.11*# of type {12,12} Chiral Non-SD Non-MSD Group <312,46> Number of orientably-regular maps = 4 Genus 27 map C27.4 of type {4,12} Chiral Genus 27 map C27.4# of type {4,12} Chiral Genus 27 map C27.4* of type {12,4} Chiral Genus 27 map C27.4*# of type {12,4} Chiral Group <312,47> Number of orientably-regular maps = 2 Genus 72 map R72.16 of type {39,52} Reflexible Genus 72 map R72.16* of type {52,39} Reflexible Group <312,48> Number of orientably-regular maps = 2 Genus 36 map R36.5 of type {4,39} Reflexible Genus 36 map R36.5* of type {39,4} Reflexible Group <312,50> Number of orientably-regular maps = 2 Genus 49 map R49.54 of type {6,39} Reflexible Genus 49 map R49.54* of type {39,6} Reflexible Group <312,51> Number of orientably-regular maps = 4 Genus 1 map C1.11 of type {3,6} Chiral Genus 1 map C1.11# of type {3,6} Chiral Genus 1 map C1.11* of type {6,3} Chiral Genus 1 map C1.11*# of type {6,3} Chiral Group <312,52> Number of orientably-regular maps = 2 Genus 53 map C53.9 of type {12,12} Chiral Self-dual Genus 53 map C53.9# of type {12,12} Chiral Self-dual Group <312,56> Number of orientably-regular maps = 3 Genus 73 map R73.110 of type {39,78} Reflexible Genus 73 map R73.110* of type {78,39} Reflexible Genus 75 map R75.26 of type {78,78} Reflexible Self-dual ............................................................................... Groups of order 314 Total = 2 Group <314,1> Number of orientably-regular maps = 2 Genus 0 map R0.156 of type {2,157} Reflexible Genus 0 map R0.156* of type {157,2} Reflexible Group <314,2> Number of orientably-regular maps = 2 Genus 78 map R78.22 of type {157,314} Reflexible Genus 78 map R78.22* of type {314,157} Reflexible ............................................................................... Groups of order 316 Total = 4 Group <316,2> Number of orientably-regular maps = 1 Genus 79 map R79.21 of type {316,316} Reflexible Self-dual Group <316,3> Number of orientably-regular maps = 2 Genus 0 map R0.157 of type {2,158} Reflexible Genus 0 map R0.157* of type {158,2} Reflexible Group <316,4> Number of orientably-regular maps = 1 Genus 78 map R78.23 of type {158,158} Reflexible Self-dual ............................................................................... Groups of order 318 Total = 4 Group <318,1> Number of orientably-regular maps = 2 Genus 78 map R78.21 of type {106,159} Reflexible Genus 78 map R78.21* of type {159,106} Reflexible Group <318,2> Number of orientably-regular maps = 2 Genus 53 map R53.10 of type {6,159} Reflexible Genus 53 map R53.10* of type {159,6} Reflexible Group <318,3> Number of orientably-regular maps = 2 Genus 0 map R0.158 of type {2,159} Reflexible Genus 0 map R0.158* of type {159,2} Reflexible Group <318,4> Number of orientably-regular maps = 2 Genus 79 map R79.18 of type {159,318} Reflexible Genus 79 map R79.18* of type {318,159} Reflexible ............................................................................... Groups of order 320 Total = 1640 Group <320,2> Number of orientably-regular maps = 1 Genus 80 map R80.20 of type {320,320} Reflexible Self-dual Group <320,4> Number of orientably-regular maps = 2 Genus 75 map R75.21 of type {32,160} Reflexible Genus 75 map R75.21* of type {160,32} Reflexible Group <320,5> Number of orientably-regular maps = 2 Genus 75 map R75.20 of type {32,160} Reflexible Genus 75 map R75.20* of type {160,32} Reflexible Group <320,6> Number of orientably-regular maps = 2 Genus 0 map R0.159 of type {2,160} Reflexible Genus 0 map R0.159* of type {160,2} Reflexible Group <320,7> Number of orientably-regular maps = 2 Genus 40 map R40.3 of type {4,160} Reflexible Genus 40 map R40.3* of type {160,4} Reflexible Group <320,9> Number of orientably-regular maps = 2 Genus 53 map R53.11 of type {8,20} Reflexible Genus 53 map R53.11* of type {20,8} Reflexible Group <320,17> Number of orientably-regular maps = 2 Genus 57 map R57.44 of type {8,40} Reflexible Genus 57 map R57.44* of type {40,8} Reflexible Group <320,22> Number of orientably-regular maps = 2 Genus 57 map R57.45 of type {8,40} Reflexible Genus 57 map R57.45* of type {40,8} Reflexible Group <320,26> Number of orientably-regular maps = 2 Genus 57 map R57.46 of type {8,40} Reflexible Genus 57 map R57.46* of type {40,8} Reflexible Group <320,28> Number of orientably-regular maps = 2 Genus 37 map R37.19 of type {4,40} Reflexible Genus 37 map R37.19* of type {40,4} Reflexible Group <320,29> Number of orientably-regular maps = 2 Genus 53 map R53.12 of type {8,20} Reflexible Genus 53 map R53.12* of type {20,8} Reflexible Group <320,32> Number of orientably-regular maps = 2 Genus 33 map R33.25 of type {4,20} Reflexible Genus 33 map R33.25* of type {20,4} Reflexible Group <320,33> Number of orientably-regular maps = 2 Genus 37 map R37.20 of type {4,40} Reflexible Genus 37 map R37.20* of type {40,4} Reflexible Group <320,35> Number of orientably-regular maps = 2 Genus 57 map R57.47 of type {8,40} Reflexible Genus 57 map R57.47* of type {40,8} Reflexible Group <320,41> Number of orientably-regular maps = 2 Genus 57 map R57.48 of type {8,40} Reflexible Genus 57 map R57.48* of type {40,8} Reflexible Group <320,43> Number of orientably-regular maps = 2 Genus 57 map R57.43 of type {8,40} Reflexible Genus 57 map R57.43* of type {40,8} Reflexible Group <320,46> Number of orientably-regular maps = 2 Genus 63 map R63.15 of type {16,20} Reflexible Genus 63 map R63.15* of type {20,16} Reflexible Group <320,49> Number of orientably-regular maps = 2 Genus 63 map R63.14 of type {16,20} Reflexible Genus 63 map R63.14* of type {20,16} Reflexible Group <320,53> Number of orientably-regular maps = 2 Genus 67 map R67.14 of type {16,40} Reflexible Genus 67 map R67.14* of type {40,16} Reflexible Group <320,55> Number of orientably-regular maps = 2 Genus 67 map R67.13 of type {16,40} Reflexible Genus 67 map R67.13* of type {40,16} Reflexible Group <320,65> Number of orientably-regular maps = 2 Genus 69 map R69.37 of type {16,80} Reflexible Genus 69 map R69.37* of type {80,16} Reflexible Group <320,66> Number of orientably-regular maps = 2 Genus 69 map R69.39 of type {16,80} Reflexible Genus 69 map R69.39* of type {80,16} Reflexible Group <320,67> Number of orientably-regular maps = 2 Genus 39 map R39.2 of type {4,80} Reflexible Genus 39 map R39.2* of type {80,4} Reflexible Group <320,68> Number of orientably-regular maps = 2 Genus 59 map R59.6 of type {8,80} Reflexible Genus 59 map R59.6* of type {80,8} Reflexible Group <320,72> Number of orientably-regular maps = 2 Genus 69 map R69.40 of type {16,80} Reflexible Genus 69 map R69.40* of type {80,16} Reflexible Group <320,73> Number of orientably-regular maps = 2 Genus 69 map R69.38 of type {16,80} Reflexible Genus 69 map R69.38* of type {80,16} Reflexible Group <320,74> Number of orientably-regular maps = 2 Genus 59 map R59.5 of type {8,80} Reflexible Genus 59 map R59.5* of type {80,8} Reflexible Group <320,76> Number of orientably-regular maps = 2 Genus 39 map R39.3 of type {4,80} Reflexible Genus 39 map R39.3* of type {80,4} Reflexible Group <320,77> Number of orientably-regular maps = 2 Genus 60 map R60.7 of type {10,32} Reflexible Genus 60 map R60.7* of type {32,10} Reflexible Group <320,79> Number of orientably-regular maps = 2 Genus 68 map R68.10 of type {20,32} Reflexible Genus 68 map R68.10* of type {32,20} Reflexible Group <320,128> Number of orientably-regular maps = 1 Genus 73 map R73.113 of type {40,40} Reflexible Self-dual Group <320,130> Number of orientably-regular maps = 2 Genus 73 map R73.112 of type {40,40} Reflexible Non-self-dual Genus 73 map R73.112* of type {40,40} Reflexible Non-self-dual Group <320,132> Number of orientably-regular maps = 2 Genus 69 map R69.41 of type {20,40} Reflexible Genus 69 map R69.41* of type {40,20} Reflexible Group <320,134> Number of orientably-regular maps = 1 Genus 73 map R73.115 of type {40,40} Reflexible Self-dual Group <320,136> Number of orientably-regular maps = 1 Genus 73 map R73.111 of type {40,40} Reflexible Self-dual Group <320,153> Number of orientably-regular maps = 1 Genus 77 map R77.40 of type {80,80} Reflexible Self-dual Group <320,154> Number of orientably-regular maps = 1 Genus 77 map R77.42 of type {80,80} Reflexible Self-dual Group <320,155> Number of orientably-regular maps = 2 Genus 77 map R77.41 of type {80,80} Reflexible Non-self-dual Genus 77 map R77.41* of type {80,80} Reflexible Non-self-dual Group <320,156> Number of orientably-regular maps = 2 Genus 69 map R69.42 of type {20,40} Reflexible Genus 69 map R69.42* of type {40,20} Reflexible Group <320,158> Number of orientably-regular maps = 1 Genus 65 map R65.132 of type {20,20} Reflexible Self-dual Group <320,160> Number of orientably-regular maps = 1 Genus 73 map R73.114 of type {40,40} Reflexible Self-dual Group <320,162> Number of orientably-regular maps = 2 Genus 71 map R71.16 of type {20,80} Reflexible Genus 71 map R71.16* of type {80,20} Reflexible Group <320,164> Number of orientably-regular maps = 2 Genus 75 map R75.23 of type {40,80} Reflexible Genus 75 map R75.23* of type {80,40} Reflexible Group <320,165> Number of orientably-regular maps = 2 Genus 71 map R71.17 of type {20,80} Reflexible Genus 71 map R71.17* of type {80,20} Reflexible Group <320,166> Number of orientably-regular maps = 2 Genus 75 map R75.22 of type {40,80} Reflexible Genus 75 map R75.22* of type {80,40} Reflexible Group <320,174> Number of orientably-regular maps = 1 Genus 79 map R79.20 of type {160,160} Reflexible Self-dual Group <320,175> Number of orientably-regular maps = 1 Genus 79 map R79.19 of type {160,160} Reflexible Self-dual Group <320,176> Number of orientably-regular maps = 2 Genus 64 map R64.26 of type {10,160} Reflexible Genus 64 map R64.26* of type {160,10} Reflexible Group <320,177> Number of orientably-regular maps = 2 Genus 72 map R72.11 of type {20,160} Reflexible Genus 72 map R72.11* of type {160,20} Reflexible Group <320,179> Number of orientably-regular maps = 2 Genus 71 map C71.11 of type {32,32} Chiral Self-dual Genus 71 map C71.11# of type {32,32} Chiral Self-dual Group <320,180> Number of orientably-regular maps = 2 Genus 71 map C71.12 of type {32,32} Chiral Self-dual Genus 71 map C71.12# of type {32,32} Chiral Self-dual Group <320,191> Number of orientably-regular maps = 2 Genus 1 map C1.38 of type {4,4} Chiral Self-dual Genus 1 map C1.38# of type {4,4} Chiral Self-dual Group <320,194> Number of orientably-regular maps = 2 Genus 41 map C41.18 of type {8,8} Chiral Self-dual Genus 41 map C41.18# of type {8,8} Chiral Self-dual Group <320,202> Number of orientably-regular maps = 4 Genus 21 map C21.3 of type {4,8} Chiral Genus 21 map C21.3# of type {4,8} Chiral Genus 21 map C21.3* of type {8,4} Chiral Genus 21 map C21.3*# of type {8,4} Chiral Group <320,206> Number of orientably-regular maps = 4 Genus 21 map C21.2 of type {4,8} Chiral Genus 21 map C21.2# of type {4,8} Chiral Genus 21 map C21.2* of type {8,4} Chiral Genus 21 map C21.2*# of type {8,4} Chiral Group <320,209> Number of orientably-regular maps = 4 Genus 41 map C41.15 of type {8,8} Chiral Non-SD Non-MSD Genus 41 map C41.15# of type {8,8} Chiral Non-SD Non-MSD Genus 41 map C41.15* of type {8,8} Chiral Non-SD Non-MSD Genus 41 map C41.15*# of type {8,8} Chiral Non-SD Non-MSD Group <320,225> Number of orientably-regular maps = 2 Genus 61 map C61.14 of type {16,16} Chiral Self-dual Genus 61 map C61.14# of type {16,16} Chiral Self-dual Group <320,229> Number of orientably-regular maps = 2 Genus 61 map C61.13 of type {16,16} Chiral Self-dual Genus 61 map C61.13# of type {16,16} Chiral Self-dual Group <320,236> Number of orientably-regular maps = 4 Genus 61 map C61.12 of type {16,16} Chiral Non-SD Non-MSD Genus 61 map C61.12# of type {16,16} Chiral Non-SD Non-MSD Genus 61 map C61.12* of type {16,16} Chiral Non-SD Non-MSD Genus 61 map C61.12*# of type {16,16} Chiral Non-SD Non-MSD Group <320,242> Number of orientably-regular maps = 4 Genus 31 map C31.2 of type {4,16} Chiral Genus 31 map C31.2# of type {4,16} Chiral Genus 31 map C31.2* of type {16,4} Chiral Genus 31 map C31.2*# of type {16,4} Chiral Group <320,244> Number of orientably-regular maps = 4 Genus 51 map C51.15 of type {8,16} Chiral Genus 51 map C51.15# of type {8,16} Chiral Genus 51 map C51.15* of type {16,8} Chiral Genus 51 map C51.15*# of type {16,8} Chiral Group <320,245> Number of orientably-regular maps = 4 Genus 31 map C31.1 of type {4,16} Chiral Genus 31 map C31.1# of type {4,16} Chiral Genus 31 map C31.1* of type {16,4} Chiral Genus 31 map C31.1*# of type {16,4} Chiral Group <320,247> Number of orientably-regular maps = 4 Genus 51 map C51.14 of type {8,16} Chiral Genus 51 map C51.14# of type {8,16} Chiral Genus 51 map C51.14* of type {16,8} Chiral Genus 51 map C51.14*# of type {16,8} Chiral Group <320,253> Number of orientably-regular maps = 2 Genus 41 map C41.14 of type {8,8} Chiral Self-dual Genus 41 map C41.14# of type {8,8} Chiral Self-dual Group <320,263> Number of orientably-regular maps = 2 Genus 41 map C41.16 of type {8,8} Chiral Self-dual Genus 41 map C41.16# of type {8,8} Chiral Self-dual Group <320,265> Number of orientably-regular maps = 2 Genus 41 map C41.17 of type {8,8} Chiral Self-dual Genus 41 map C41.17# of type {8,8} Chiral Self-dual Group <320,1582> Number of orientably-regular maps = 12 Genus 9 map R9.2 of type {4,5} Reflexible Genus 9 map R9.2* of type {5,4} Reflexible Genus 25 map R25.6 of type {4,10} Reflexible Genus 25 map R25.6* of type {10,4} Reflexible Genus 29 map R29.7 of type {5,8} Reflexible Genus 29 map R29.7* of type {8,5} Reflexible Genus 29 map R29.8 of type {5,8} Reflexible Genus 29 map R29.8* of type {8,5} Reflexible Genus 45 map R45.15 of type {8,10} Reflexible Genus 45 map R45.15* of type {10,8} Reflexible Genus 45 map R45.16 of type {8,10} Reflexible Genus 45 map R45.16* of type {10,8} Reflexible Group <320,1584> Number of orientably-regular maps = 2 Genus 65 map R65.128 of type {20,20} Reflexible Self-dual Genus 65 map R65.130 of type {20,20} Reflexible Self-dual Group <320,1585> Number of orientably-regular maps = 6 Genus 33 map R33.31 of type {5,10} Reflexible Genus 33 map R33.31* of type {10,5} Reflexible Genus 49 map R49.62 of type {10,10} Reflexible Self-dual Genus 49 map R49.63 of type {10,10} Reflexible Self-dual Genus 49 map R49.65 of type {10,10} Reflexible Non-self-dual Genus 49 map R49.65* of type {10,10} Reflexible Non-self-dual Group <320,1586> Number of orientably-regular maps = 10 Genus 41 map R41.20 of type {5,20} Reflexible Genus 41 map R41.20* of type {20,5} Reflexible Genus 41 map R41.21 of type {5,20} Reflexible Genus 41 map R41.21* of type {20,5} Reflexible Genus 57 map R57.51 of type {10,20} Reflexible Genus 57 map R57.51* of type {20,10} Reflexible Genus 57 map R57.52 of type {10,20} Reflexible Genus 57 map R57.52* of type {20,10} Reflexible Genus 65 map R65.129 of type {20,20} Reflexible Self-dual Genus 65 map R65.131 of type {20,20} Reflexible Self-dual Group <320,1635> Number of orientably-regular maps = 6 Genus 21 map C21.1 of type {4,8} Chiral Genus 21 map C21.1# of type {4,8} Chiral Genus 21 map C21.1* of type {8,4} Chiral Genus 21 map C21.1*# of type {8,4} Chiral Genus 41 map C41.13 of type {8,8} Chiral Self-dual Genus 41 map C41.13# of type {8,8} Chiral Self-dual Group <320,1636> Number of orientably-regular maps = 2 Genus 25 map R25.7 of type {4,10} Reflexible Genus 25 map R25.7* of type {10,4} Reflexible Group <320,1637> Number of orientably-regular maps = 1 Genus 49 map R49.64 of type {10,10} Reflexible Self-dual ............................................................................... Groups of order 322 Total = 4 Group <322,1> Number of orientably-regular maps = 2 Genus 77 map R77.39 of type {46,161} Reflexible Genus 77 map R77.39* of type {161,46} Reflexible Group <322,2> Number of orientably-regular maps = 2 Genus 69 map R69.36 of type {14,161} Reflexible Genus 69 map R69.36* of type {161,14} Reflexible Group <322,3> Number of orientably-regular maps = 2 Genus 0 map R0.160 of type {2,161} Reflexible Genus 0 map R0.160* of type {161,2} Reflexible Group <322,4> Number of orientably-regular maps = 2 Genus 80 map R80.18 of type {161,322} Reflexible Genus 80 map R80.18* of type {322,161} Reflexible ............................................................................... Groups of order 324 Total = 176 Group <324,2> Number of orientably-regular maps = 1 Genus 81 map R81.181 of type {324,324} Reflexible Self-dual Group <324,3> Number of orientably-regular maps = 1 Genus 78 map R78.20 of type {81,81} Reflexible Self-dual Group <324,4> Number of orientably-regular maps = 2 Genus 0 map R0.161 of type {2,162} Reflexible Genus 0 map R0.161* of type {162,2} Reflexible Group <324,5> Number of orientably-regular maps = 1 Genus 80 map R80.19 of type {162,162} Reflexible Self-dual Group <324,35> Number of orientably-regular maps = 1 Genus 1 map R1.27 of type {4,4} Reflexible Self-dual Group <324,36> Number of orientably-regular maps = 1 Genus 64 map R64.34 of type {18,18} Reflexible Self-dual Group <324,37> Number of orientably-regular maps = 2 Genus 46 map R46.14 of type {6,18} Reflexible Genus 46 map R46.14* of type {18,6} Reflexible Group <324,38> Number of orientably-regular maps = 2 Genus 52 map R52.6 of type {6,54} Reflexible Genus 52 map R52.6* of type {54,6} Reflexible Group <324,39> Number of orientably-regular maps = 2 Genus 28 map R28.11 of type {6,6} Reflexible Non-self-dual Genus 28 map R28.11* of type {6,6} Reflexible Non-self-dual Group <324,40> Number of orientably-regular maps = 2 Genus 46 map R46.16 of type {6,18} Reflexible Genus 46 map R46.16* of type {18,6} Reflexible Group <324,41> Number of orientably-regular maps = 2 Genus 46 map R46.17 of type {6,18} Reflexible Genus 46 map R46.17* of type {18,6} Reflexible Group <324,61> Number of orientably-regular maps = 2 Genus 64 map R64.32 of type {18,18} Reflexible Non-self-dual Genus 64 map R64.32* of type {18,18} Reflexible Non-self-dual Group <324,62> Number of orientably-regular maps = 2 Genus 64 map R64.30 of type {18,18} Reflexible Non-self-dual Genus 64 map R64.30* of type {18,18} Reflexible Non-self-dual Group <324,63> Number of orientably-regular maps = 2 Genus 46 map R46.19 of type {6,18} Reflexible Genus 46 map R46.19* of type {18,6} Reflexible Group <324,64> Number of orientably-regular maps = 4 Genus 64 map C64.19 of type {18,18} Chiral Non-SD Non-MSD Genus 64 map C64.19# of type {18,18} Chiral Non-SD Non-MSD Genus 64 map C64.19* of type {18,18} Chiral Non-SD Non-MSD Genus 64 map C64.19*# of type {18,18} Chiral Non-SD Non-MSD Group <324,65> Number of orientably-regular maps = 2 Genus 52 map R52.7 of type {6,54} Reflexible Genus 52 map R52.7* of type {54,6} Reflexible Group <324,66> Number of orientably-regular maps = 2 Genus 76 map R76.31 of type {54,54} Reflexible Non-self-dual Genus 76 map R76.31* of type {54,54} Reflexible Non-self-dual Group <324,67> Number of orientably-regular maps = 4 Genus 52 map C52.1 of type {6,54} Chiral Genus 52 map C52.1# of type {6,54} Chiral Genus 52 map C52.1* of type {54,6} Chiral Genus 52 map C52.1*# of type {54,6} Chiral Group <324,68> Number of orientably-regular maps = 2 Genus 46 map R46.22 of type {6,18} Reflexible Genus 46 map R46.22* of type {18,6} Reflexible Group <324,69> Number of orientably-regular maps = 2 Genus 46 map R46.20 of type {6,18} Reflexible Genus 46 map R46.20* of type {18,6} Reflexible Group <324,70> Number of orientably-regular maps = 2 Genus 64 map R64.33 of type {18,18} Reflexible Non-self-dual Genus 64 map R64.33* of type {18,18} Reflexible Non-self-dual Group <324,71> Number of orientably-regular maps = 2 Genus 46 map R46.21 of type {6,18} Reflexible Genus 46 map R46.21* of type {18,6} Reflexible Group <324,72> Number of orientably-regular maps = 2 Genus 46 map R46.18 of type {6,18} Reflexible Genus 46 map R46.18* of type {18,6} Reflexible Group <324,73> Number of orientably-regular maps = 2 Genus 28 map R28.12 of type {6,6} Reflexible Non-self-dual Genus 28 map R28.12* of type {6,6} Reflexible Non-self-dual Group <324,109> Number of orientably-regular maps = 1 Genus 73 map R73.109 of type {36,36} Reflexible Self-dual Group <324,110> Number of orientably-regular maps = 1 Genus 55 map R55.33 of type {12,12} Reflexible Self-dual Group <324,111> Number of orientably-regular maps = 2 Genus 73 map R73.108 of type {36,36} Reflexible Non-self-dual Genus 73 map R73.108* of type {36,36} Reflexible Non-self-dual Group <324,114> Number of orientably-regular maps = 2 Genus 46 map R46.15 of type {6,18} Reflexible Genus 46 map R46.15* of type {18,6} Reflexible Group <324,115> Number of orientably-regular maps = 1 Genus 64 map R64.31 of type {18,18} Reflexible Self-dual Group <324,116> Number of orientably-regular maps = 2 Genus 28 map R28.9 of type {6,6} Reflexible Non-self-dual Genus 28 map R28.9* of type {6,6} Reflexible Non-self-dual Group <324,117> Number of orientably-regular maps = 1 Genus 28 map R28.10 of type {6,6} Reflexible Self-dual Group <324,118> Number of orientably-regular maps = 4 Genus 46 map C46.5 of type {6,18} Chiral Genus 46 map C46.5# of type {6,18} Chiral Genus 46 map C46.5* of type {18,6} Chiral Genus 46 map C46.5*# of type {18,6} Chiral Group <324,160> Number of orientably-regular maps = 4 Genus 10 map R10.1 of type {3,9} Reflexible Genus 10 map R10.1* of type {9,3} Reflexible Genus 46 map R46.27 of type {9,9} Reflexible Self-dual Genus 46 map R46.28 of type {9,9} Reflexible Self-dual ............................................................................... Groups of order 326 Total = 2 Group <326,1> Number of orientably-regular maps = 2 Genus 0 map R0.162 of type {2,163} Reflexible Genus 0 map R0.162* of type {163,2} Reflexible Group <326,2> Number of orientably-regular maps = 2 Genus 81 map R81.179 of type {163,326} Reflexible Genus 81 map R81.179* of type {326,163} Reflexible ............................................................................... Groups of order 328 Total = 15 Group <328,2> Number of orientably-regular maps = 1 Genus 82 map R82.82 of type {328,328} Reflexible Self-dual Group <328,5> Number of orientably-regular maps = 2 Genus 41 map R41.17 of type {4,164} Reflexible Genus 41 map R41.17* of type {164,4} Reflexible Group <328,6> Number of orientably-regular maps = 2 Genus 0 map R0.163 of type {2,164} Reflexible Genus 0 map R0.163* of type {164,2} Reflexible Group <328,8> Number of orientably-regular maps = 2 Genus 40 map R40.2 of type {4,82} Reflexible Genus 40 map R40.2* of type {82,4} Reflexible Group <328,9> Number of orientably-regular maps = 1 Genus 81 map R81.180 of type {164,164} Reflexible Self-dual Group <328,10> Number of orientably-regular maps = 2 Genus 80 map R80.17 of type {82,164} Reflexible Genus 80 map R80.17* of type {164,82} Reflexible Group <328,12> Number of orientably-regular maps = 4 Genus 42 map C42.3 of type {8,8} Chiral Non-SD Non-MSD Genus 42 map C42.3# of type {8,8} Chiral Non-SD Non-MSD Genus 42 map C42.3* of type {8,8} Chiral Non-SD Non-MSD Genus 42 map C42.3*# of type {8,8} Chiral Non-SD Non-MSD Group <328,13> Number of orientably-regular maps = 2 Genus 1 map C1.39 of type {4,4} Chiral Self-dual Genus 1 map C1.39# of type {4,4} Chiral Self-dual ............................................................................... Groups of order 330 Total = 12 Group <330,1> Number of orientably-regular maps = 8 Genus 67 map C67.2 of type {15,30} Chiral Genus 67 map C67.2# of type {15,30} Chiral Genus 67 map C67.2* of type {30,15} Chiral Genus 67 map C67.2*# of type {30,15} Chiral Genus 67 map C67.3 of type {15,30} Chiral Genus 67 map C67.3# of type {15,30} Chiral Genus 67 map C67.3* of type {30,15} Chiral Genus 67 map C67.3*# of type {30,15} Chiral Group <330,3> Number of orientably-regular maps = 8 Genus 56 map C56.3 of type {10,15} Chiral Genus 56 map C56.3# of type {10,15} Chiral Genus 56 map C56.3* of type {15,10} Chiral Genus 56 map C56.3*# of type {15,10} Chiral Genus 56 map C56.4 of type {10,15} Chiral Genus 56 map C56.4# of type {10,15} Chiral Genus 56 map C56.4* of type {15,10} Chiral Genus 56 map C56.4*# of type {15,10} Chiral Group <330,5> Number of orientably-regular maps = 2 Genus 77 map R77.37 of type {30,165} Reflexible Genus 77 map R77.37* of type {165,30} Reflexible Group <330,6> Number of orientably-regular maps = 2 Genus 80 map R80.16 of type {66,165} Reflexible Genus 80 map R80.16* of type {165,66} Reflexible Group <330,7> Number of orientably-regular maps = 2 Genus 55 map R55.31 of type {6,165} Reflexible Genus 55 map R55.31* of type {165,6} Reflexible Group <330,8> Number of orientably-regular maps = 2 Genus 81 map R81.178 of type {110,165} Reflexible Genus 81 map R81.178* of type {165,110} Reflexible Group <330,9> Number of orientably-regular maps = 2 Genus 66 map R66.11 of type {10,165} Reflexible Genus 66 map R66.11* of type {165,10} Reflexible Group <330,10> Number of orientably-regular maps = 2 Genus 75 map R75.16 of type {22,165} Reflexible Genus 75 map R75.16* of type {165,22} Reflexible Group <330,11> Number of orientably-regular maps = 2 Genus 0 map R0.164 of type {2,165} Reflexible Genus 0 map R0.164* of type {165,2} Reflexible Group <330,12> Number of orientably-regular maps = 2 Genus 82 map R82.80 of type {165,330} Reflexible Genus 82 map R82.80* of type {330,165} Reflexible ............................................................................... Groups of order 332 Total = 4 Group <332,2> Number of orientably-regular maps = 1 Genus 83 map R83.18 of type {332,332} Reflexible Self-dual Group <332,3> Number of orientably-regular maps = 2 Genus 0 map R0.165 of type {2,166} Reflexible Genus 0 map R0.165* of type {166,2} Reflexible Group <332,4> Number of orientably-regular maps = 1 Genus 82 map R82.81 of type {166,166} Reflexible Self-dual ............................................................................... Groups of order 334 Total = 2 Group <334,1> Number of orientably-regular maps = 2 Genus 0 map R0.166 of type {2,167} Reflexible Genus 0 map R0.166* of type {167,2} Reflexible Group <334,2> Number of orientably-regular maps = 2 Genus 83 map R83.15 of type {167,334} Reflexible Genus 83 map R83.15* of type {334,167} Reflexible ............................................................................... Groups of order 336 Total = 228 Group <336,6> Number of orientably-regular maps = 1 Genus 84 map R84.20 of type {336,336} Reflexible Self-dual Group <336,7> Number of orientably-regular maps = 4 Genus 71 map C71.9 of type {24,24} Chiral Non-SD Non-MSD Genus 71 map C71.9# of type {24,24} Chiral Non-SD Non-MSD Genus 71 map C71.9* of type {24,24} Chiral Non-SD Non-MSD Genus 71 map C71.9*# of type {24,24} Chiral Non-SD Non-MSD Group <336,8> Number of orientably-regular maps = 4 Genus 71 map C71.10 of type {24,24} Chiral Non-SD Non-MSD Genus 71 map C71.10# of type {24,24} Chiral Non-SD Non-MSD Genus 71 map C71.10* of type {24,24} Chiral Non-SD Non-MSD Genus 71 map C71.10*# of type {24,24} Chiral Non-SD Non-MSD Group <336,9> Number of orientably-regular maps = 4 Genus 64 map C64.18 of type {12,24} Chiral Genus 64 map C64.18# of type {12,24} Chiral Genus 64 map C64.18* of type {24,12} Chiral Genus 64 map C64.18*# of type {24,12} Chiral Group <336,10> Number of orientably-regular maps = 4 Genus 50 map C50.6 of type {6,24} Chiral Genus 50 map C50.6# of type {6,24} Chiral Genus 50 map C50.6* of type {24,6} Chiral Genus 50 map C50.6*# of type {24,6} Chiral Group <336,17> Number of orientably-regular maps = 4 Genus 57 map C57.3 of type {12,12} Chiral Non-SD Non-MSD Genus 57 map C57.3# of type {12,12} Chiral Non-SD Non-MSD Genus 57 map C57.3* of type {12,12} Chiral Non-SD Non-MSD Genus 57 map C57.3*# of type {12,12} Chiral Non-SD Non-MSD Group <336,18> Number of orientably-regular maps = 4 Genus 50 map C50.5 of type {6,24} Chiral Genus 50 map C50.5# of type {6,24} Chiral Genus 50 map C50.5* of type {24,6} Chiral Genus 50 map C50.5*# of type {24,6} Chiral Group <336,20> Number of orientably-regular maps = 4 Genus 64 map C64.17 of type {12,24} Chiral Genus 64 map C64.17# of type {12,24} Chiral Genus 64 map C64.17* of type {24,12} Chiral Genus 64 map C64.17*# of type {24,12} Chiral Group <336,25> Number of orientably-regular maps = 2 Genus 75 map R75.17 of type {24,56} Reflexible Genus 75 map R75.17* of type {56,24} Reflexible Group <336,28> Number of orientably-regular maps = 2 Genus 75 map R75.18 of type {24,56} Reflexible Genus 75 map R75.18* of type {56,24} Reflexible Group <336,30> Number of orientably-regular maps = 2 Genus 54 map R54.4 of type {6,56} Reflexible Genus 54 map R54.4* of type {56,6} Reflexible Group <336,31> Number of orientably-regular maps = 2 Genus 66 map R66.13 of type {14,24} Reflexible Genus 66 map R66.13* of type {24,14} Reflexible Group <336,35> Number of orientably-regular maps = 2 Genus 68 map R68.8 of type {12,56} Reflexible Genus 68 map R68.8* of type {56,12} Reflexible Group <336,37> Number of orientably-regular maps = 2 Genus 72 map R72.12 of type {24,28} Reflexible Genus 72 map R72.12* of type {28,24} Reflexible Group <336,44> Number of orientably-regular maps = 2 Genus 65 map R65.126 of type {12,28} Reflexible Genus 65 map R65.126* of type {28,12} Reflexible Group <336,58> Number of orientably-regular maps = 2 Genus 77 map R77.34 of type {24,168} Reflexible Genus 77 map R77.34* of type {168,24} Reflexible Group <336,59> Number of orientably-regular maps = 2 Genus 77 map R77.35 of type {24,168} Reflexible Genus 77 map R77.35* of type {168,24} Reflexible Group <336,60> Number of orientably-regular maps = 2 Genus 70 map R70.11 of type {12,168} Reflexible Genus 70 map R70.11* of type {168,12} Reflexible Group <336,61> Number of orientably-regular maps = 2 Genus 56 map R56.8 of type {6,168} Reflexible Genus 56 map R56.8* of type {168,6} Reflexible Group <336,68> Number of orientably-regular maps = 2 Genus 69 map R69.35 of type {12,84} Reflexible Genus 69 map R69.35* of type {84,12} Reflexible Group <336,69> Number of orientably-regular maps = 2 Genus 74 map R74.10 of type {24,42} Reflexible Genus 74 map R74.10* of type {42,24} Reflexible Group <336,71> Number of orientably-regular maps = 2 Genus 76 map R76.30 of type {24,84} Reflexible Genus 76 map R76.30* of type {84,24} Reflexible Group <336,74> Number of orientably-regular maps = 2 Genus 81 map R81.174 of type {56,168} Reflexible Genus 81 map R81.174* of type {168,56} Reflexible Group <336,75> Number of orientably-regular maps = 2 Genus 81 map R81.173 of type {56,168} Reflexible Genus 81 map R81.173* of type {168,56} Reflexible Group <336,76> Number of orientably-regular maps = 2 Genus 78 map R78.17 of type {28,168} Reflexible Genus 78 map R78.17* of type {168,28} Reflexible Group <336,77> Number of orientably-regular maps = 2 Genus 72 map R72.9 of type {14,168} Reflexible Genus 72 map R72.9* of type {168,14} Reflexible Group <336,84> Number of orientably-regular maps = 2 Genus 77 map R77.36 of type {28,84} Reflexible Genus 77 map R77.36* of type {84,28} Reflexible Group <336,85> Number of orientably-regular maps = 2 Genus 78 map R78.19 of type {42,56} Reflexible Genus 78 map R78.19* of type {56,42} Reflexible Group <336,87> Number of orientably-regular maps = 2 Genus 80 map R80.15 of type {56,84} Reflexible Genus 80 map R80.15* of type {84,56} Reflexible Group <336,90> Number of orientably-regular maps = 2 Genus 63 map R63.11 of type {8,168} Reflexible Genus 63 map R63.11* of type {168,8} Reflexible Group <336,91> Number of orientably-regular maps = 2 Genus 63 map R63.10 of type {8,168} Reflexible Genus 63 map R63.10* of type {168,8} Reflexible Group <336,92> Number of orientably-regular maps = 2 Genus 42 map R42.3 of type {4,168} Reflexible Genus 42 map R42.3* of type {168,4} Reflexible Group <336,93> Number of orientably-regular maps = 2 Genus 0 map R0.167 of type {2,168} Reflexible Genus 0 map R0.167* of type {168,2} Reflexible Group <336,100> Number of orientably-regular maps = 2 Genus 41 map R41.16 of type {4,84} Reflexible Genus 41 map R41.16* of type {84,4} Reflexible Group <336,101> Number of orientably-regular maps = 2 Genus 60 map R60.6 of type {8,42} Reflexible Genus 60 map R60.6* of type {42,8} Reflexible Group <336,103> Number of orientably-regular maps = 2 Genus 62 map R62.5 of type {8,84} Reflexible Genus 62 map R62.5* of type {84,8} Reflexible Group <336,107> Number of orientably-regular maps = 1 Genus 81 map R81.177 of type {84,84} Reflexible Self-dual Group <336,109> Number of orientably-regular maps = 1 Genus 83 map R83.17 of type {168,168} Reflexible Self-dual Group <336,110> Number of orientably-regular maps = 1 Genus 83 map R83.16 of type {168,168} Reflexible Self-dual Group <336,111> Number of orientably-regular maps = 2 Genus 80 map R80.14 of type {42,168} Reflexible Genus 80 map R80.14* of type {168,42} Reflexible Group <336,112> Number of orientably-regular maps = 2 Genus 82 map R82.79 of type {84,168} Reflexible Genus 82 map R82.79* of type {168,84} Reflexible Group <336,116> Number of orientably-regular maps = 4 Genus 74 map R74.9 of type {21,56} Reflexible Genus 74 map R74.9* of type {56,21} Reflexible Genus 78 map R78.18 of type {42,56} Reflexible Genus 78 map R78.18* of type {56,42} Reflexible Group <336,119> Number of orientably-regular maps = 4 Genus 56 map R56.10 of type {8,21} Reflexible Genus 56 map R56.10* of type {21,8} Reflexible Genus 60 map R60.5 of type {8,42} Reflexible Genus 60 map R60.5* of type {42,8} Reflexible Group <336,131> Number of orientably-regular maps = 4 Genus 63 map R63.12 of type {12,21} Reflexible Genus 63 map R63.12* of type {21,12} Reflexible Genus 67 map R67.12 of type {12,42} Reflexible Genus 67 map R67.12* of type {42,12} Reflexible Group <336,134> Number of orientably-regular maps = 8 Genus 15 map C15.1 of type {3,12} Chiral Genus 15 map C15.1# of type {3,12} Chiral Genus 15 map C15.1* of type {12,3} Chiral Genus 15 map C15.1*# of type {12,3} Chiral Genus 43 map C43.6 of type {6,12} Chiral Genus 43 map C43.6# of type {6,12} Chiral Genus 43 map C43.6* of type {12,6} Chiral Genus 43 map C43.6*# of type {12,6} Chiral Group <336,168> Number of orientably-regular maps = 2 Genus 81 map R81.175 of type {84,84} Reflexible Self-dual Genus 81 map R81.176 of type {84,84} Reflexible Self-dual Group <336,170> Number of orientably-regular maps = 4 Genus 75 map R75.15 of type {21,84} Reflexible Genus 75 map R75.15* of type {84,21} Reflexible Genus 79 map R79.17 of type {42,84} Reflexible Genus 79 map R79.17* of type {84,42} Reflexible Group <336,208> Number of orientably-regular maps = 23 Genus 8 map R8.1 of type {3,8} Reflexible Genus 8 map R8.1* of type {8,3} Reflexible Genus 8 map R8.2 of type {3,8} Reflexible Genus 8 map R8.2* of type {8,3} Reflexible Genus 15 map R15.4 of type {4,6} Reflexible Genus 15 map R15.4* of type {6,4} Reflexible Genus 22 map R22.3 of type {4,8} Reflexible Genus 22 map R22.3* of type {8,4} Reflexible Genus 22 map R22.4 of type {4,8} Reflexible Genus 22 map R22.4* of type {8,4} Reflexible Genus 29 map R29.9 of type {6,6} Reflexible Self-dual Genus 33 map R33.37 of type {6,7} Reflexible Genus 33 map R33.37* of type {7,6} Reflexible Genus 36 map R36.9 of type {6,8} Reflexible Genus 36 map R36.9* of type {8,6} Reflexible Genus 36 map R36.10 of type {6,8} Reflexible Genus 36 map R36.10* of type {8,6} Reflexible Genus 40 map R40.9 of type {7,8} Reflexible Genus 40 map R40.9* of type {8,7} Reflexible Genus 40 map R40.10 of type {7,8} Reflexible Genus 40 map R40.10* of type {8,7} Reflexible Genus 43 map R43.14 of type {8,8} Reflexible Self-dual Genus 43 map R43.15 of type {8,8} Reflexible Self-dual Group <336,209> Number of orientably-regular maps = 15 Genus 17 map R17.2 of type {3,14} Reflexible Genus 17 map R17.2* of type {14,3} Reflexible Genus 19 map R19.4 of type {4,7} Reflexible Genus 19 map R19.4* of type {7,4} Reflexible Genus 31 map R31.4 of type {4,14} Reflexible Genus 31 map R31.4* of type {14,4} Reflexible Genus 31 map R31.5 of type {4,14} Reflexible Genus 31 map R31.5* of type {14,4} Reflexible Genus 33 map R33.38 of type {6,7} Reflexible Genus 33 map R33.38* of type {7,6} Reflexible Genus 45 map R45.14 of type {6,14} Reflexible Genus 45 map R45.14* of type {14,6} Reflexible Genus 49 map R49.58 of type {7,14} Reflexible Genus 49 map R49.58* of type {14,7} Reflexible Genus 61 map R61.23 of type {14,14} Reflexible Self-dual Group <336,211> Number of orientably-regular maps = 4 Genus 65 map C65.18 of type {14,21} Chiral Genus 65 map C65.18# of type {14,21} Chiral Genus 65 map C65.18* of type {21,14} Chiral Genus 65 map C65.18*# of type {21,14} Chiral Group <336,212> Number of orientably-regular maps = 2 Genus 51 map R51.15 of type {6,28} Reflexible Genus 51 map R51.15* of type {28,6} Reflexible Group <336,213> Number of orientably-regular maps = 6 Genus 73 map C73.10 of type {21,42} Chiral Genus 73 map C73.10# of type {21,42} Chiral Genus 73 map C73.10* of type {42,21} Chiral Genus 73 map C73.10*# of type {42,21} Chiral Genus 77 map C77.4 of type {42,42} Chiral Mirror-self-dual Genus 77 map C77.4# of type {42,42} Chiral Mirror-self-dual Group <336,214> Number of orientably-regular maps = 2 Genus 75 map R75.19 of type {28,42} Reflexible Genus 75 map R75.19* of type {42,28} Reflexible Group <336,215> Number of orientably-regular maps = 2 Genus 39 map R39.1 of type {4,42} Reflexible Genus 39 map R39.1* of type {42,4} Reflexible Group <336,217> Number of orientably-regular maps = 2 Genus 53 map R53.9 of type {6,42} Reflexible Genus 53 map R53.9* of type {42,6} Reflexible Group <336,218> Number of orientably-regular maps = 4 Genus 29 map C29.1 of type {6,6} Chiral Non-SD Non-MSD Genus 29 map C29.1# of type {6,6} Chiral Non-SD Non-MSD Genus 29 map C29.1* of type {6,6} Chiral Non-SD Non-MSD Genus 29 map C29.1*# of type {6,6} Chiral Non-SD Non-MSD Group <336,221> Number of orientably-regular maps = 1 Genus 77 map R77.38 of type {42,42} Reflexible Self-dual ............................................................................... Groups of order 338 Total = 5 Group <338,1> Number of orientably-regular maps = 2 Genus 0 map R0.168 of type {2,169} Reflexible Genus 0 map R0.168* of type {169,2} Reflexible Group <338,2> Number of orientably-regular maps = 2 Genus 84 map R84.18 of type {169,338} Reflexible Genus 84 map R84.18* of type {338,169} Reflexible Group <338,3> Number of orientably-regular maps = 2 Genus 66 map R66.12 of type {13,26} Reflexible Genus 66 map R66.12* of type {26,13} Reflexible ............................................................................... Groups of order 340 Total = 15 Group <340,4> Number of orientably-regular maps = 1 Genus 85 map R85.76 of type {340,340} Reflexible Self-dual Group <340,5> Number of orientably-regular maps = 2 Genus 69 map C69.9 of type {20,20} Chiral Self-dual Genus 69 map C69.9# of type {20,20} Chiral Self-dual Group <340,7> Number of orientably-regular maps = 2 Genus 81 map C81.41 of type {68,68} Chiral Self-dual Genus 81 map C81.41# of type {68,68} Chiral Self-dual Group <340,9> Number of orientably-regular maps = 2 Genus 1 map C1.41 of type {4,4} Chiral Self-dual Genus 1 map C1.41# of type {4,4} Chiral Self-dual Group <340,10> Number of orientably-regular maps = 2 Genus 1 map C1.40 of type {4,4} Chiral Self-dual Genus 1 map C1.40# of type {4,4} Chiral Self-dual Group <340,11> Number of orientably-regular maps = 2 Genus 64 map R64.25 of type {10,34} Reflexible Genus 64 map R64.25* of type {34,10} Reflexible Group <340,12> Number of orientably-regular maps = 2 Genus 68 map R68.7 of type {10,170} Reflexible Genus 68 map R68.7* of type {170,10} Reflexible Group <340,13> Number of orientably-regular maps = 2 Genus 80 map R80.13 of type {34,170} Reflexible Genus 80 map R80.13* of type {170,34} Reflexible Group <340,14> Number of orientably-regular maps = 2 Genus 0 map R0.169 of type {2,170} Reflexible Genus 0 map R0.169* of type {170,2} Reflexible Group <340,15> Number of orientably-regular maps = 1 Genus 84 map R84.19 of type {170,170} Reflexible Self-dual ............................................................................... Groups of order 342 Total = 18 Group <342,1> Number of orientably-regular maps = 4 Genus 58 map C58.9 of type {9,18} Chiral Genus 58 map C58.9# of type {9,18} Chiral Genus 58 map C58.9* of type {18,9} Chiral Genus 58 map C58.9*# of type {18,9} Chiral Group <342,3> Number of orientably-regular maps = 2 Genus 81 map R81.171 of type {38,171} Reflexible Genus 81 map R81.171* of type {171,38} Reflexible Group <342,4> Number of orientably-regular maps = 2 Genus 76 map R76.28 of type {18,171} Reflexible Genus 76 map R76.28* of type {171,18} Reflexible Group <342,5> Number of orientably-regular maps = 2 Genus 0 map R0.170 of type {2,171} Reflexible Genus 0 map R0.170* of type {171,2} Reflexible Group <342,6> Number of orientably-regular maps = 2 Genus 85 map R85.74 of type {171,342} Reflexible Genus 85 map R85.74* of type {342,171} Reflexible Group <342,7> Number of orientably-regular maps = 12 Genus 58 map C58.6 of type {9,18} Chiral Genus 58 map C58.6# of type {9,18} Chiral Genus 58 map C58.6* of type {18,9} Chiral Genus 58 map C58.6*# of type {18,9} Chiral Genus 58 map C58.7 of type {9,18} Chiral Genus 58 map C58.7# of type {9,18} Chiral Genus 58 map C58.7* of type {18,9} Chiral Genus 58 map C58.7*# of type {18,9} Chiral Genus 58 map C58.8 of type {9,18} Chiral Genus 58 map C58.8# of type {9,18} Chiral Genus 58 map C58.8* of type {18,9} Chiral Genus 58 map C58.8*# of type {18,9} Chiral Group <342,11> Number of orientably-regular maps = 4 Genus 1 map C1.12 of type {3,6} Chiral Genus 1 map C1.12# of type {3,6} Chiral Genus 1 map C1.12* of type {6,3} Chiral Genus 1 map C1.12*# of type {6,3} Chiral Group <342,14> Number of orientably-regular maps = 2 Genus 82 map R82.78 of type {57,114} Reflexible Genus 82 map R82.78* of type {114,57} Reflexible Group <342,15> Number of orientably-regular maps = 2 Genus 55 map R55.30 of type {6,57} Reflexible Genus 55 map R55.30* of type {57,6} Reflexible ............................................................................... Groups of order 344 Total = 12 Group <344,2> Number of orientably-regular maps = 1 Genus 86 map R86.16 of type {344,344} Reflexible Self-dual Group <344,4> Number of orientably-regular maps = 2 Genus 43 map R43.7 of type {4,172} Reflexible Genus 43 map R43.7* of type {172,4} Reflexible Group <344,5> Number of orientably-regular maps = 2 Genus 0 map R0.171 of type {2,172} Reflexible Genus 0 map R0.171* of type {172,2} Reflexible Group <344,7> Number of orientably-regular maps = 2 Genus 42 map R42.2 of type {4,86} Reflexible Genus 42 map R42.2* of type {86,4} Reflexible Group <344,8> Number of orientably-regular maps = 1 Genus 85 map R85.75 of type {172,172} Reflexible Self-dual Group <344,9> Number of orientably-regular maps = 2 Genus 84 map R84.16 of type {86,172} Reflexible Genus 84 map R84.16* of type {172,86} Reflexible ............................................................................... Groups of order 346 Total = 2 Group <346,1> Number of orientably-regular maps = 2 Genus 0 map R0.172 of type {2,173} Reflexible Genus 0 map R0.172* of type {173,2} Reflexible Group <346,2> Number of orientably-regular maps = 2 Genus 86 map R86.14 of type {173,346} Reflexible Genus 86 map R86.14* of type {346,173} Reflexible ............................................................................... Groups of order 348 Total = 12 Group <348,4> Number of orientably-regular maps = 1 Genus 87 map R87.19 of type {348,348} Reflexible Self-dual Group <348,5> Number of orientably-regular maps = 2 Genus 59 map C59.9 of type {12,12} Chiral Self-dual Genus 59 map C59.9# of type {12,12} Chiral Self-dual Group <348,7> Number of orientably-regular maps = 2 Genus 56 map R56.7 of type {6,58} Reflexible Genus 56 map R56.7* of type {58,6} Reflexible Group <348,8> Number of orientably-regular maps = 1 Genus 84 map R84.17 of type {87,87} Reflexible Self-dual Group <348,9> Number of orientably-regular maps = 2 Genus 58 map R58.7 of type {6,174} Reflexible Genus 58 map R58.7* of type {174,6} Reflexible Group <348,10> Number of orientably-regular maps = 2 Genus 84 map R84.15 of type {58,174} Reflexible Genus 84 map R84.15* of type {174,58} Reflexible Group <348,11> Number of orientably-regular maps = 2 Genus 0 map R0.173 of type {2,174} Reflexible Genus 0 map R0.173* of type {174,2} Reflexible Group <348,12> Number of orientably-regular maps = 1 Genus 86 map R86.15 of type {174,174} Reflexible Self-dual ............................................................................... Groups of order 350 Total = 10 Group <350,1> Number of orientably-regular maps = 2 Genus 75 map R75.14 of type {14,175} Reflexible Genus 75 map R75.14* of type {175,14} Reflexible Group <350,2> Number of orientably-regular maps = 2 Genus 84 map R84.14 of type {50,175} Reflexible Genus 84 map R84.14* of type {175,50} Reflexible Group <350,3> Number of orientably-regular maps = 2 Genus 0 map R0.174 of type {2,175} Reflexible Genus 0 map R0.174* of type {175,2} Reflexible Group <350,4> Number of orientably-regular maps = 2 Genus 87 map R87.16 of type {175,350} Reflexible Genus 87 map R87.16* of type {350,175} Reflexible Group <350,6> Number of orientably-regular maps = 2 Genus 81 map R81.170 of type {35,70} Reflexible Genus 81 map R81.170* of type {70,35} Reflexible Group <350,7> Number of orientably-regular maps = 2 Genus 66 map R66.10 of type {10,35} Reflexible Genus 66 map R66.10* of type {35,10} Reflexible ............................................................................... Groups of order 352 Total = 195 Group <352,2> Number of orientably-regular maps = 1 Genus 88 map R88.22 of type {352,352} Reflexible Self-dual Group <352,3> Number of orientably-regular maps = 2 Genus 77 map R77.30 of type {16,176} Reflexible Genus 77 map R77.30* of type {176,16} Reflexible Group <352,4> Number of orientably-regular maps = 2 Genus 77 map R77.31 of type {16,176} Reflexible Genus 77 map R77.31* of type {176,16} Reflexible Group <352,5> Number of orientably-regular maps = 2 Genus 0 map R0.175 of type {2,176} Reflexible Genus 0 map R0.175* of type {176,2} Reflexible Group <352,6> Number of orientably-regular maps = 2 Genus 44 map R44.2 of type {4,176} Reflexible Genus 44 map R44.2* of type {176,4} Reflexible Group <352,11> Number of orientably-regular maps = 2 Genus 63 map R63.9 of type {8,44} Reflexible Genus 63 map R63.9* of type {44,8} Reflexible Group <352,12> Number of orientably-regular maps = 2 Genus 41 map R41.15 of type {4,44} Reflexible Genus 41 map R41.15* of type {44,4} Reflexible Group <352,15> Number of orientably-regular maps = 2 Genus 63 map R63.8 of type {8,44} Reflexible Genus 63 map R63.8* of type {44,8} Reflexible Group <352,26> Number of orientably-regular maps = 2 Genus 65 map R65.111 of type {8,88} Reflexible Genus 65 map R65.111* of type {88,8} Reflexible Group <352,27> Number of orientably-regular maps = 2 Genus 43 map R43.5 of type {4,88} Reflexible Genus 43 map R43.5* of type {88,4} Reflexible Group <352,29> Number of orientably-regular maps = 2 Genus 65 map R65.110 of type {8,88} Reflexible Genus 65 map R65.110* of type {88,8} Reflexible Group <352,31> Number of orientably-regular maps = 2 Genus 43 map R43.6 of type {4,88} Reflexible Genus 43 map R43.6* of type {88,4} Reflexible Group <352,32> Number of orientably-regular maps = 2 Genus 70 map R70.12 of type {16,22} Reflexible Genus 70 map R70.12* of type {22,16} Reflexible Group <352,34> Number of orientably-regular maps = 2 Genus 74 map R74.8 of type {16,44} Reflexible Genus 74 map R74.8* of type {44,16} Reflexible Group <352,47> Number of orientably-regular maps = 1 Genus 85 map R85.73 of type {88,88} Reflexible Self-dual Group <352,48> Number of orientably-regular maps = 1 Genus 81 map R81.172 of type {44,44} Reflexible Self-dual Group <352,49> Number of orientably-regular maps = 1 Genus 85 map R85.72 of type {88,88} Reflexible Self-dual Group <352,51> Number of orientably-regular maps = 2 Genus 83 map R83.13 of type {44,88} Reflexible Genus 83 map R83.13* of type {88,44} Reflexible Group <352,53> Number of orientably-regular maps = 2 Genus 83 map R83.14 of type {44,88} Reflexible Genus 83 map R83.14* of type {88,44} Reflexible Group <352,58> Number of orientably-regular maps = 1 Genus 87 map R87.18 of type {176,176} Reflexible Self-dual Group <352,59> Number of orientably-regular maps = 1 Genus 87 map R87.17 of type {176,176} Reflexible Self-dual Group <352,60> Number of orientably-regular maps = 2 Genus 80 map R80.12 of type {22,176} Reflexible Genus 80 map R80.12* of type {176,22} Reflexible Group <352,61> Number of orientably-regular maps = 2 Genus 84 map R84.13 of type {44,176} Reflexible Genus 84 map R84.13* of type {176,44} Reflexible ............................................................................... Groups of order 354 Total = 4 Group <354,1> Number of orientably-regular maps = 2 Genus 87 map R87.15 of type {118,177} Reflexible Genus 87 map R87.15* of type {177,118} Reflexible Group <354,2> Number of orientably-regular maps = 2 Genus 59 map R59.4 of type {6,177} Reflexible Genus 59 map R59.4* of type {177,6} Reflexible Group <354,3> Number of orientably-regular maps = 2 Genus 0 map R0.176 of type {2,177} Reflexible Genus 0 map R0.176* of type {177,2} Reflexible Group <354,4> Number of orientably-regular maps = 2 Genus 88 map R88.20 of type {177,354} Reflexible Genus 88 map R88.20* of type {354,177} Reflexible ............................................................................... Groups of order 356 Total = 5 Group <356,2> Number of orientably-regular maps = 1 Genus 89 map R89.72 of type {356,356} Reflexible Self-dual Group <356,3> Number of orientably-regular maps = 2 Genus 1 map C1.42 of type {4,4} Chiral Self-dual Genus 1 map C1.42# of type {4,4} Chiral Self-dual Group <356,4> Number of orientably-regular maps = 2 Genus 0 map R0.177 of type {2,178} Reflexible Genus 0 map R0.177* of type {178,2} Reflexible Group <356,5> Number of orientably-regular maps = 1 Genus 88 map R88.21 of type {178,178} Reflexible Self-dual ............................................................................... Groups of order 358 Total = 2 Group <358,1> Number of orientably-regular maps = 2 Genus 0 map R0.178 of type {2,179} Reflexible Genus 0 map R0.178* of type {179,2} Reflexible Group <358,2> Number of orientably-regular maps = 2 Genus 89 map R89.70 of type {179,358} Reflexible Genus 89 map R89.70* of type {358,179} Reflexible ............................................................................... Groups of order 360 Total = 162 Group <360,4> Number of orientably-regular maps = 1 Genus 90 map R90.21 of type {360,360} Reflexible Self-dual Group <360,9> Number of orientably-regular maps = 2 Genus 77 map R77.33 of type {20,36} Reflexible Genus 77 map R77.33* of type {36,20} Reflexible Group <360,10> Number of orientably-regular maps = 2 Genus 68 map R68.6 of type {10,36} Reflexible Genus 68 map R68.6* of type {36,10} Reflexible Group <360,13> Number of orientably-regular maps = 2 Genus 72 map R72.10 of type {18,20} Reflexible Genus 72 map R72.10* of type {20,18} Reflexible Group <360,16> Number of orientably-regular maps = 2 Genus 85 map R85.68 of type {36,180} Reflexible Genus 85 map R85.68* of type {180,36} Reflexible Group <360,17> Number of orientably-regular maps = 2 Genus 80 map R80.10 of type {18,180} Reflexible Genus 80 map R80.10* of type {180,18} Reflexible Group <360,19> Number of orientably-regular maps = 2 Genus 84 map R84.12 of type {36,90} Reflexible Genus 84 map R84.12* of type {90,36} Reflexible Group <360,21> Number of orientably-regular maps = 2 Genus 81 map R81.146 of type {20,180} Reflexible Genus 81 map R81.146* of type {180,20} Reflexible Group <360,22> Number of orientably-regular maps = 2 Genus 72 map R72.7 of type {10,180} Reflexible Genus 72 map R72.7* of type {180,10} Reflexible Group <360,24> Number of orientably-regular maps = 2 Genus 80 map R80.11 of type {20,90} Reflexible Genus 80 map R80.11* of type {90,20} Reflexible Group <360,26> Number of orientably-regular maps = 2 Genus 45 map R45.11 of type {4,180} Reflexible Genus 45 map R45.11* of type {180,4} Reflexible Group <360,27> Number of orientably-regular maps = 2 Genus 0 map R0.179 of type {2,180} Reflexible Genus 0 map R0.179* of type {180,2} Reflexible Group <360,29> Number of orientably-regular maps = 2 Genus 44 map R44.1 of type {4,90} Reflexible Genus 44 map R44.1* of type {90,4} Reflexible Group <360,30> Number of orientably-regular maps = 1 Genus 89 map R89.71 of type {180,180} Reflexible Self-dual Group <360,31> Number of orientably-regular maps = 2 Genus 88 map R88.19 of type {90,180} Reflexible Genus 88 map R88.19* of type {180,90} Reflexible Group <360,39> Number of orientably-regular maps = 4 Genus 41 map C41.11 of type {4,36} Chiral Genus 41 map C41.11# of type {4,36} Chiral Genus 41 map C41.11* of type {36,4} Chiral Genus 41 map C41.11*# of type {36,4} Chiral Group <360,40> Number of orientably-regular maps = 2 Genus 78 map R78.16 of type {20,45} Reflexible Genus 78 map R78.16* of type {45,20} Reflexible Group <360,41> Number of orientably-regular maps = 2 Genus 42 map R42.1 of type {4,45} Reflexible Genus 42 map R42.1* of type {45,4} Reflexible Group <360,42> Number of orientably-regular maps = 2 Genus 77 map R77.32 of type {18,45} Reflexible Genus 77 map R77.32* of type {45,18} Reflexible Group <360,43> Number of orientably-regular maps = 2 Genus 81 map C81.40 of type {36,36} Chiral Self-dual Genus 81 map C81.40# of type {36,36} Chiral Self-dual Group <360,46> Number of orientably-regular maps = 3 Genus 85 map R85.69 of type {45,90} Reflexible Genus 85 map R85.69* of type {90,45} Reflexible Genus 87 map R87.14 of type {90,90} Reflexible Self-dual Group <360,60> Number of orientably-regular maps = 2 Genus 73 map R73.104 of type {12,60} Reflexible Genus 73 map R73.104* of type {60,12} Reflexible Group <360,62> Number of orientably-regular maps = 2 Genus 58 map R58.6 of type {6,60} Reflexible Genus 58 map R58.6* of type {60,6} Reflexible Group <360,63> Number of orientably-regular maps = 2 Genus 70 map R70.8 of type {12,30} Reflexible Genus 70 map R70.8* of type {30,12} Reflexible Group <360,73> Number of orientably-regular maps = 1 Genus 85 map R85.71 of type {60,60} Reflexible Self-dual Group <360,75> Number of orientably-regular maps = 2 Genus 82 map R82.77 of type {30,60} Reflexible Genus 82 map R82.77* of type {60,30} Reflexible Group <360,79> Number of orientably-regular maps = 2 Genus 73 map R73.103 of type {12,60} Reflexible Genus 73 map R73.103* of type {60,12} Reflexible Group <360,81> Number of orientably-regular maps = 2 Genus 58 map R58.5 of type {6,60} Reflexible Genus 58 map R58.5* of type {60,6} Reflexible Group <360,82> Number of orientably-regular maps = 2 Genus 70 map R70.10 of type {12,30} Reflexible Genus 70 map R70.10* of type {30,12} Reflexible Group <360,96> Number of orientably-regular maps = 2 Genus 85 map R85.70 of type {60,60} Reflexible Non-self-dual Genus 85 map R85.70* of type {60,60} Reflexible Non-self-dual Group <360,97> Number of orientably-regular maps = 2 Genus 82 map R82.76 of type {30,60} Reflexible Genus 82 map R82.76* of type {60,30} Reflexible Group <360,99> Number of orientably-regular maps = 2 Genus 82 map R82.75 of type {30,60} Reflexible Genus 82 map R82.75* of type {60,30} Reflexible Group <360,101> Number of orientably-regular maps = 2 Genus 73 map R73.102 of type {12,60} Reflexible Genus 73 map R73.102* of type {60,12} Reflexible Group <360,102> Number of orientably-regular maps = 2 Genus 58 map R58.4 of type {6,60} Reflexible Genus 58 map R58.4* of type {60,6} Reflexible Group <360,104> Number of orientably-regular maps = 2 Genus 70 map R70.9 of type {12,30} Reflexible Genus 70 map R70.9* of type {30,12} Reflexible Group <360,118> Number of orientably-regular maps = 3 Genus 10 map R10.6 of type {4,5} Reflexible Genus 10 map R10.6* of type {5,4} Reflexible Genus 19 map R19.13 of type {5,5} Reflexible Self-dual Group <360,119> Number of orientably-regular maps = 7 Genus 31 map R31.12 of type {6,6} Reflexible Self-dual Genus 46 map R46.13 of type {6,12} Reflexible Genus 46 map R46.13* of type {12,6} Reflexible Genus 49 map R49.53 of type {6,15} Reflexible Genus 49 map R49.53* of type {15,6} Reflexible Genus 64 map R64.28 of type {12,15} Reflexible Genus 64 map R64.28* of type {15,12} Reflexible Group <360,120> Number of orientably-regular maps = 4 Genus 34 map R34.3 of type {4,15} Reflexible Genus 34 map R34.3* of type {15,4} Reflexible Genus 49 map R49.52 of type {6,15} Reflexible Genus 49 map R49.52* of type {15,6} Reflexible Group <360,121> Number of orientably-regular maps = 6 Genus 13 map R13.1 of type {3,10} Reflexible Genus 13 map R13.1* of type {10,3} Reflexible Genus 49 map R49.49 of type {6,15} Reflexible Genus 49 map R49.49* of type {15,6} Reflexible Genus 61 map R61.22 of type {10,15} Reflexible Genus 61 map R61.22* of type {15,10} Reflexible Group <360,122> Number of orientably-regular maps = 9 Genus 25 map R25.5 of type {3,30} Reflexible Genus 25 map R25.5* of type {30,3} Reflexible Genus 49 map R49.50 of type {6,15} Reflexible Genus 49 map R49.50* of type {15,6} Reflexible Genus 55 map R55.29 of type {6,30} Reflexible Genus 55 map R55.29* of type {30,6} Reflexible Genus 73 map R73.105 of type {15,30} Reflexible Genus 73 map R73.105* of type {30,15} Reflexible Genus 79 map R79.16 of type {30,30} Reflexible Self-dual Group <360,123> Number of orientably-regular maps = 2 Genus 82 map C82.14 of type {40,40} Chiral Self-dual Genus 82 map C82.14# of type {40,40} Chiral Self-dual Group <360,126> Number of orientably-regular maps = 4 Genus 61 map C61.11 of type {12,12} Chiral Non-SD Non-MSD Genus 61 map C61.11# of type {12,12} Chiral Non-SD Non-MSD Genus 61 map C61.11* of type {12,12} Chiral Non-SD Non-MSD Genus 61 map C61.11*# of type {12,12} Chiral Non-SD Non-MSD Group <360,129> Number of orientably-regular maps = 2 Genus 61 map C61.10 of type {12,12} Chiral Self-dual Genus 61 map C61.10# of type {12,12} Chiral Self-dual Group <360,130> Number of orientably-regular maps = 2 Genus 37 map R37.18 of type {4,20} Reflexible Genus 37 map R37.18* of type {20,4} Reflexible Group <360,132> Number of orientably-regular maps = 2 Genus 76 map R76.29 of type {20,30} Reflexible Genus 76 map R76.29* of type {30,20} Reflexible Group <360,133> Number of orientably-regular maps = 2 Genus 40 map R40.1 of type {4,30} Reflexible Genus 40 map R40.1* of type {30,4} Reflexible Group <360,134> Number of orientably-regular maps = 2 Genus 52 map R52.5 of type {6,20} Reflexible Genus 52 map R52.5* of type {20,6} Reflexible Group <360,138> Number of orientably-regular maps = 2 Genus 76 map R76.27 of type {15,60} Reflexible Genus 76 map R76.27* of type {60,15} Reflexible Group <360,139> Number of orientably-regular maps = 2 Genus 64 map R64.27 of type {12,15} Reflexible Genus 64 map R64.27* of type {15,12} Reflexible Group <360,143> Number of orientably-regular maps = 2 Genus 73 map R73.106 of type {15,30} Reflexible Genus 73 map R73.106* of type {30,15} Reflexible Group <360,144> Number of orientably-regular maps = 2 Genus 49 map R49.51 of type {6,15} Reflexible Genus 49 map R49.51* of type {15,6} Reflexible Group <360,148> Number of orientably-regular maps = 1 Genus 73 map R73.107 of type {20,20} Reflexible Self-dual Group <360,150> Number of orientably-regular maps = 2 Genus 1 map C1.43 of type {4,4} Chiral Self-dual Genus 1 map C1.43# of type {4,4} Chiral Self-dual ............................................................................... Groups of order 362 Total = 2 Group <362,1> Number of orientably-regular maps = 2 Genus 0 map R0.180 of type {2,181} Reflexible Genus 0 map R0.180* of type {181,2} Reflexible Group <362,2> Number of orientably-regular maps = 2 Genus 90 map R90.19 of type {181,362} Reflexible Genus 90 map R90.19* of type {362,181} Reflexible ............................................................................... Groups of order 364 Total = 11 Group <364,4> Number of orientably-regular maps = 1 Genus 91 map R91.71 of type {364,364} Reflexible Self-dual Group <364,5> Number of orientably-regular maps = 2 Genus 79 map C79.16 of type {28,28} Chiral Self-dual Genus 79 map C79.16# of type {28,28} Chiral Self-dual Group <364,7> Number of orientably-regular maps = 2 Genus 72 map R72.8 of type {14,26} Reflexible Genus 72 map R72.8* of type {26,14} Reflexible Group <364,8> Number of orientably-regular maps = 2 Genus 78 map R78.15 of type {14,182} Reflexible Genus 78 map R78.15* of type {182,14} Reflexible Group <364,9> Number of orientably-regular maps = 2 Genus 84 map R84.11 of type {26,182} Reflexible Genus 84 map R84.11* of type {182,26} Reflexible Group <364,10> Number of orientably-regular maps = 2 Genus 0 map R0.181 of type {2,182} Reflexible Genus 0 map R0.181* of type {182,2} Reflexible Group <364,11> Number of orientably-regular maps = 1 Genus 90 map R90.20 of type {182,182} Reflexible Self-dual ............................................................................... Groups of order 366 Total = 6 Group <366,1> Number of orientably-regular maps = 4 Genus 1 map C1.13 of type {3,6} Chiral Genus 1 map C1.13# of type {3,6} Chiral Genus 1 map C1.13* of type {6,3} Chiral Genus 1 map C1.13*# of type {6,3} Chiral Group <366,3> Number of orientably-regular maps = 2 Genus 90 map R90.18 of type {122,183} Reflexible Genus 90 map R90.18* of type {183,122} Reflexible Group <366,4> Number of orientably-regular maps = 2 Genus 61 map R61.21 of type {6,183} Reflexible Genus 61 map R61.21* of type {183,6} Reflexible Group <366,5> Number of orientably-regular maps = 2 Genus 0 map R0.182 of type {2,183} Reflexible Genus 0 map R0.182* of type {183,2} Reflexible Group <366,6> Number of orientably-regular maps = 2 Genus 91 map R91.68 of type {183,366} Reflexible Genus 91 map R91.68* of type {366,183} Reflexible ............................................................................... Groups of order 368 Total = 42 Group <368,2> Number of orientably-regular maps = 1 Genus 92 map R92.19 of type {368,368} Reflexible Self-dual Group <368,3> Number of orientably-regular maps = 2 Genus 69 map R69.27 of type {8,184} Reflexible Genus 69 map R69.27* of type {184,8} Reflexible Group <368,4> Number of orientably-regular maps = 2 Genus 69 map R69.28 of type {8,184} Reflexible Genus 69 map R69.28* of type {184,8} Reflexible Group <368,5> Number of orientably-regular maps = 2 Genus 46 map R46.10 of type {4,184} Reflexible Genus 46 map R46.10* of type {184,4} Reflexible Group <368,6> Number of orientably-regular maps = 2 Genus 0 map R0.183 of type {2,184} Reflexible Genus 0 map R0.183* of type {184,2} Reflexible Group <368,13> Number of orientably-regular maps = 2 Genus 45 map R45.10 of type {4,92} Reflexible Genus 45 map R45.10* of type {92,4} Reflexible Group <368,14> Number of orientably-regular maps = 2 Genus 66 map R66.8 of type {8,46} Reflexible Genus 66 map R66.8* of type {46,8} Reflexible Group <368,16> Number of orientably-regular maps = 2 Genus 68 map R68.5 of type {8,92} Reflexible Genus 68 map R68.5* of type {92,8} Reflexible Group <368,20> Number of orientably-regular maps = 1 Genus 89 map R89.69 of type {92,92} Reflexible Self-dual Group <368,22> Number of orientably-regular maps = 1 Genus 91 map R91.70 of type {184,184} Reflexible Self-dual Group <368,23> Number of orientably-regular maps = 1 Genus 91 map R91.69 of type {184,184} Reflexible Self-dual Group <368,24> Number of orientably-regular maps = 2 Genus 88 map R88.18 of type {46,184} Reflexible Genus 88 map R88.18* of type {184,46} Reflexible Group <368,25> Number of orientably-regular maps = 2 Genus 90 map R90.16 of type {92,184} Reflexible Genus 90 map R90.16* of type {184,92} Reflexible ............................................................................... Groups of order 370 Total = 4 Group <370,1> Number of orientably-regular maps = 2 Genus 90 map R90.15 of type {74,185} Reflexible Genus 90 map R90.15* of type {185,74} Reflexible Group <370,2> Number of orientably-regular maps = 2 Genus 74 map R74.7 of type {10,185} Reflexible Genus 74 map R74.7* of type {185,10} Reflexible Group <370,3> Number of orientably-regular maps = 2 Genus 0 map R0.184 of type {2,185} Reflexible Genus 0 map R0.184* of type {185,2} Reflexible Group <370,4> Number of orientably-regular maps = 2 Genus 92 map R92.17 of type {185,370} Reflexible Genus 92 map R92.17* of type {370,185} Reflexible ............................................................................... Groups of order 372 Total = 15 Group <372,6> Number of orientably-regular maps = 1 Genus 93 map R93.35 of type {372,372} Reflexible Self-dual Group <372,7> Number of orientably-regular maps = 4 Genus 32 map C32.3 of type {6,6} Chiral Non-SD Non-MSD Genus 32 map C32.3# of type {6,6} Chiral Non-SD Non-MSD Genus 32 map C32.3* of type {6,6} Chiral Non-SD Non-MSD Genus 32 map C32.3*# of type {6,6} Chiral Non-SD Non-MSD Group <372,8> Number of orientably-regular maps = 2 Genus 60 map R60.4 of type {6,62} Reflexible Genus 60 map R60.4* of type {62,6} Reflexible Group <372,10> Number of orientably-regular maps = 1 Genus 90 map R90.17 of type {93,93} Reflexible Self-dual Group <372,12> Number of orientably-regular maps = 2 Genus 62 map R62.4 of type {6,186} Reflexible Genus 62 map R62.4* of type {186,6} Reflexible Group <372,13> Number of orientably-regular maps = 2 Genus 90 map R90.14 of type {62,186} Reflexible Genus 90 map R90.14* of type {186,62} Reflexible Group <372,14> Number of orientably-regular maps = 2 Genus 0 map R0.185 of type {2,186} Reflexible Genus 0 map R0.185* of type {186,2} Reflexible Group <372,15> Number of orientably-regular maps = 1 Genus 92 map R92.18 of type {186,186} Reflexible Self-dual ............................................................................... Groups of order 374 Total = 4 Group <374,1> Number of orientably-regular maps = 2 Genus 88 map R88.16 of type {34,187} Reflexible Genus 88 map R88.16* of type {187,34} Reflexible Group <374,2> Number of orientably-regular maps = 2 Genus 85 map R85.56 of type {22,187} Reflexible Genus 85 map R85.56* of type {187,22} Reflexible Group <374,3> Number of orientably-regular maps = 2 Genus 0 map R0.186 of type {2,187} Reflexible Genus 0 map R0.186* of type {187,2} Reflexible Group <374,4> Number of orientably-regular maps = 2 Genus 93 map R93.33 of type {187,374} Reflexible Genus 93 map R93.33* of type {374,187} Reflexible ............................................................................... Groups of order 376 Total = 12 Group <376,2> Number of orientably-regular maps = 1 Genus 94 map R94.24 of type {376,376} Reflexible Self-dual Group <376,4> Number of orientably-regular maps = 2 Genus 47 map R47.3 of type {4,188} Reflexible Genus 47 map R47.3* of type {188,4} Reflexible Group <376,5> Number of orientably-regular maps = 2 Genus 0 map R0.187 of type {2,188} Reflexible Genus 0 map R0.187* of type {188,2} Reflexible Group <376,7> Number of orientably-regular maps = 2 Genus 46 map R46.9 of type {4,94} Reflexible Genus 46 map R46.9* of type {94,4} Reflexible Group <376,8> Number of orientably-regular maps = 1 Genus 93 map R93.34 of type {188,188} Reflexible Self-dual Group <376,9> Number of orientably-regular maps = 2 Genus 92 map R92.16 of type {94,188} Reflexible Genus 92 map R92.16* of type {188,94} Reflexible ............................................................................... Groups of order 378 Total = 60 Group <378,1> Number of orientably-regular maps = 4 Genus 85 map C85.14 of type {27,54} Chiral Genus 85 map C85.14# of type {27,54} Chiral Genus 85 map C85.14* of type {54,27} Chiral Genus 85 map C85.14*# of type {54,27} Chiral Group <378,3> Number of orientably-regular maps = 2 Genus 81 map R81.129 of type {14,189} Reflexible Genus 81 map R81.129* of type {189,14} Reflexible Group <378,4> Number of orientably-regular maps = 2 Genus 91 map R91.66 of type {54,189} Reflexible Genus 91 map R91.66* of type {189,54} Reflexible Group <378,5> Number of orientably-regular maps = 2 Genus 0 map R0.188 of type {2,189} Reflexible Genus 0 map R0.188* of type {189,2} Reflexible Group <378,6> Number of orientably-regular maps = 2 Genus 94 map R94.22 of type {189,378} Reflexible Genus 94 map R94.22* of type {378,189} Reflexible Group <378,18> Number of orientably-regular maps = 4 Genus 43 map C43.4 of type {6,9} Chiral Genus 43 map C43.4# of type {6,9} Chiral Genus 43 map C43.4* of type {9,6} Chiral Genus 43 map C43.4*# of type {9,6} Chiral Group <378,19> Number of orientably-regular maps = 4 Genus 43 map C43.5 of type {6,9} Chiral Genus 43 map C43.5# of type {6,9} Chiral Genus 43 map C43.5* of type {9,6} Chiral Genus 43 map C43.5*# of type {9,6} Chiral Group <378,20> Number of orientably-regular maps = 4 Genus 43 map C43.3 of type {6,9} Chiral Genus 43 map C43.3# of type {6,9} Chiral Genus 43 map C43.3* of type {9,6} Chiral Genus 43 map C43.3*# of type {9,6} Chiral Group <378,21> Number of orientably-regular maps = 4 Genus 64 map C64.16 of type {9,18} Chiral Genus 64 map C64.16# of type {9,18} Chiral Genus 64 map C64.16* of type {18,9} Chiral Genus 64 map C64.16*# of type {18,9} Chiral Group <378,22> Number of orientably-regular maps = 4 Genus 1 map C1.14 of type {3,6} Chiral Genus 1 map C1.14# of type {3,6} Chiral Genus 1 map C1.14* of type {6,3} Chiral Genus 1 map C1.14*# of type {6,3} Chiral Group <378,32> Number of orientably-regular maps = 2 Genus 88 map R88.17 of type {42,63} Reflexible Genus 88 map R88.17* of type {63,42} Reflexible Group <378,33> Number of orientably-regular maps = 2 Genus 91 map R91.67 of type {63,126} Reflexible Genus 91 map R91.67* of type {126,63} Reflexible Group <378,34> Number of orientably-regular maps = 2 Genus 82 map R82.74 of type {21,42} Reflexible Genus 82 map R82.74* of type {42,21} Reflexible Group <378,35> Number of orientably-regular maps = 4 Genus 88 map C88.5 of type {42,63} Chiral Genus 88 map C88.5# of type {42,63} Chiral Genus 88 map C88.5* of type {63,42} Chiral Genus 88 map C88.5*# of type {63,42} Chiral Group <378,36> Number of orientably-regular maps = 2 Genus 61 map R61.20 of type {6,63} Reflexible Genus 61 map R61.20* of type {63,6} Reflexible Group <378,37> Number of orientably-regular maps = 2 Genus 82 map R82.73 of type {18,63} Reflexible Genus 82 map R82.73* of type {63,18} Reflexible Group <378,38> Number of orientably-regular maps = 2 Genus 55 map R55.28 of type {6,21} Reflexible Genus 55 map R55.28* of type {21,6} Reflexible Group <378,39> Number of orientably-regular maps = 4 Genus 61 map C61.9 of type {6,63} Chiral Genus 61 map C61.9# of type {6,63} Chiral Genus 61 map C61.9* of type {63,6} Chiral Genus 61 map C61.9*# of type {63,6} Chiral ............................................................................... Groups of order 380 Total = 11 Group <380,4> Number of orientably-regular maps = 1 Genus 95 map R95.20 of type {380,380} Reflexible Self-dual Group <380,5> Number of orientably-regular maps = 2 Genus 91 map C91.27 of type {76,76} Chiral Self-dual Genus 91 map C91.27# of type {76,76} Chiral Self-dual Group <380,7> Number of orientably-regular maps = 2 Genus 72 map R72.6 of type {10,38} Reflexible Genus 72 map R72.6* of type {38,10} Reflexible Group <380,8> Number of orientably-regular maps = 2 Genus 76 map R76.26 of type {10,190} Reflexible Genus 76 map R76.26* of type {190,10} Reflexible Group <380,9> Number of orientably-regular maps = 2 Genus 90 map R90.13 of type {38,190} Reflexible Genus 90 map R90.13* of type {190,38} Reflexible Group <380,10> Number of orientably-regular maps = 2 Genus 0 map R0.189 of type {2,190} Reflexible Genus 0 map R0.189* of type {190,2} Reflexible Group <380,11> Number of orientably-regular maps = 1 Genus 94 map R94.23 of type {190,190} Reflexible Self-dual ............................................................................... Groups of order 382 Total = 2 Group <382,1> Number of orientably-regular maps = 2 Genus 0 map R0.190 of type {2,191} Reflexible Genus 0 map R0.190* of type {191,2} Reflexible Group <382,2> Number of orientably-regular maps = 2 Genus 95 map R95.17 of type {191,382} Reflexible Genus 95 map R95.17* of type {382,191} Reflexible ............................................................................... Groups of order 384 Total = 20169 Group <384,2> Number of orientably-regular maps = 1 Genus 96 map R96.29 of type {384,384} Reflexible Self-dual Group <384,7> Number of orientably-regular maps = 2 Genus 93 map R93.26 of type {64,192} Reflexible Genus 93 map R93.26* of type {192,64} Reflexible Group <384,8> Number of orientably-regular maps = 2 Genus 93 map R93.25 of type {64,192} Reflexible Genus 93 map R93.25* of type {192,64} Reflexible Group <384,9> Number of orientably-regular maps = 2 Genus 0 map R0.191 of type {2,192} Reflexible Genus 0 map R0.191* of type {192,2} Reflexible Group <384,10> Number of orientably-regular maps = 2 Genus 48 map R48.3 of type {4,192} Reflexible Genus 48 map R48.3* of type {192,4} Reflexible Group <384,17> Number of orientably-regular maps = 2 Genus 77 map R77.25 of type {16,24} Reflexible Genus 77 map R77.25* of type {24,16} Reflexible Group <384,19> Number of orientably-regular maps = 2 Genus 77 map R77.24 of type {16,24} Reflexible Genus 77 map R77.24* of type {24,16} Reflexible Group <384,20> Number of orientably-regular maps = 2 Genus 65 map R65.103 of type {8,24} Reflexible Genus 65 map R65.103* of type {24,8} Reflexible Group <384,24> Number of orientably-regular maps = 2 Genus 41 map R41.11 of type {4,24} Reflexible Genus 41 map R41.11* of type {24,4} Reflexible Group <384,30> Number of orientably-regular maps = 2 Genus 65 map R65.104 of type {8,24} Reflexible Genus 65 map R65.104* of type {24,8} Reflexible Group <384,32> Number of orientably-regular maps = 2 Genus 65 map R65.101 of type {8,24} Reflexible Genus 65 map R65.101* of type {24,8} Reflexible Group <384,36> Number of orientably-regular maps = 2 Genus 41 map R41.12 of type {4,24} Reflexible Genus 41 map R41.12* of type {24,4} Reflexible Group <384,37> Number of orientably-regular maps = 2 Genus 65 map R65.105 of type {8,24} Reflexible Genus 65 map R65.105* of type {24,8} Reflexible Group <384,38> Number of orientably-regular maps = 2 Genus 41 map R41.13 of type {4,24} Reflexible Genus 41 map R41.13* of type {24,4} Reflexible Group <384,39> Number of orientably-regular maps = 2 Genus 65 map R65.106 of type {8,24} Reflexible Genus 65 map R65.106* of type {24,8} Reflexible Group <384,41> Number of orientably-regular maps = 2 Genus 77 map R77.28 of type {16,24} Reflexible Genus 77 map R77.28* of type {24,16} Reflexible Group <384,43> Number of orientably-regular maps = 2 Genus 77 map R77.23 of type {16,24} Reflexible Genus 77 map R77.23* of type {24,16} Reflexible Group <384,47> Number of orientably-regular maps = 2 Genus 77 map R77.29 of type {16,24} Reflexible Genus 77 map R77.29* of type {24,16} Reflexible Group <384,49> Number of orientably-regular maps = 2 Genus 77 map R77.22 of type {16,24} Reflexible Genus 77 map R77.22* of type {24,16} Reflexible Group <384,55> Number of orientably-regular maps = 2 Genus 65 map R65.100 of type {8,24} Reflexible Genus 65 map R65.100* of type {24,8} Reflexible Group <384,57> Number of orientably-regular maps = 2 Genus 69 map R69.34 of type {12,16} Reflexible Genus 69 map R69.34* of type {16,12} Reflexible Group <384,59> Number of orientably-regular maps = 2 Genus 77 map R77.26 of type {16,24} Reflexible Genus 77 map R77.26* of type {24,16} Reflexible Group <384,61> Number of orientably-regular maps = 2 Genus 69 map R69.33 of type {12,16} Reflexible Genus 69 map R69.33* of type {16,12} Reflexible Group <384,63> Number of orientably-regular maps = 2 Genus 77 map R77.27 of type {16,24} Reflexible Genus 77 map R77.27* of type {24,16} Reflexible Group <384,65> Number of orientably-regular maps = 2 Genus 57 map R57.39 of type {8,12} Reflexible Genus 57 map R57.39* of type {12,8} Reflexible Group <384,69> Number of orientably-regular maps = 2 Genus 65 map R65.102 of type {8,24} Reflexible Genus 65 map R65.102* of type {24,8} Reflexible Group <384,79> Number of orientably-regular maps = 2 Genus 81 map R81.134 of type {16,48} Reflexible Genus 81 map R81.134* of type {48,16} Reflexible Group <384,80> Number of orientably-regular maps = 2 Genus 69 map R69.19 of type {8,48} Reflexible Genus 69 map R69.19* of type {48,8} Reflexible Group <384,91> Number of orientably-regular maps = 2 Genus 81 map R81.135 of type {16,48} Reflexible Genus 81 map R81.135* of type {48,16} Reflexible Group <384,92> Number of orientably-regular maps = 2 Genus 69 map R69.23 of type {8,48} Reflexible Genus 69 map R69.23* of type {48,8} Reflexible Group <384,96> Number of orientably-regular maps = 4 Genus 81 map C81.38 of type {16,48} Chiral Genus 81 map C81.38# of type {16,48} Chiral Genus 81 map C81.38* of type {48,16} Chiral Genus 81 map C81.38*# of type {48,16} Chiral Group <384,98> Number of orientably-regular maps = 2 Genus 81 map R81.141 of type {16,48} Reflexible Genus 81 map R81.141* of type {48,16} Reflexible Group <384,99> Number of orientably-regular maps = 2 Genus 81 map R81.139 of type {16,48} Reflexible Genus 81 map R81.139* of type {48,16} Reflexible Group <384,102> Number of orientably-regular maps = 2 Genus 45 map R45.8 of type {4,48} Reflexible Genus 45 map R45.8* of type {48,4} Reflexible Group <384,103> Number of orientably-regular maps = 2 Genus 69 map R69.22 of type {8,48} Reflexible Genus 69 map R69.22* of type {48,8} Reflexible Group <384,106> Number of orientably-regular maps = 2 Genus 81 map R81.138 of type {16,48} Reflexible Genus 81 map R81.138* of type {48,16} Reflexible Group <384,107> Number of orientably-regular maps = 2 Genus 81 map R81.140 of type {16,48} Reflexible Genus 81 map R81.140* of type {48,16} Reflexible Group <384,110> Number of orientably-regular maps = 2 Genus 45 map R45.9 of type {4,48} Reflexible Genus 45 map R45.9* of type {48,4} Reflexible Group <384,111> Number of orientably-regular maps = 2 Genus 69 map R69.21 of type {8,48} Reflexible Genus 69 map R69.21* of type {48,8} Reflexible Group <384,114> Number of orientably-regular maps = 2 Genus 57 map R57.41 of type {8,12} Reflexible Genus 57 map R57.41* of type {12,8} Reflexible Group <384,117> Number of orientably-regular maps = 2 Genus 33 map R33.24 of type {4,12} Reflexible Genus 33 map R33.24* of type {12,4} Reflexible Group <384,118> Number of orientably-regular maps = 2 Genus 57 map R57.42 of type {8,12} Reflexible Genus 57 map R57.42* of type {12,8} Reflexible Group <384,120> Number of orientably-regular maps = 2 Genus 57 map R57.40 of type {8,12} Reflexible Genus 57 map R57.40* of type {12,8} Reflexible Group <384,122> Number of orientably-regular maps = 2 Genus 65 map R65.109 of type {8,24} Reflexible Genus 65 map R65.109* of type {24,8} Reflexible Group <384,124> Number of orientably-regular maps = 2 Genus 41 map R41.14 of type {4,24} Reflexible Genus 41 map R41.14* of type {24,4} Reflexible Group <384,126> Number of orientably-regular maps = 2 Genus 65 map R65.108 of type {8,24} Reflexible Genus 65 map R65.108* of type {24,8} Reflexible Group <384,128> Number of orientably-regular maps = 2 Genus 65 map R65.107 of type {8,24} Reflexible Genus 65 map R65.107* of type {24,8} Reflexible Group <384,132> Number of orientably-regular maps = 2 Genus 81 map R81.143 of type {16,48} Reflexible Genus 81 map R81.143* of type {48,16} Reflexible Group <384,133> Number of orientably-regular maps = 2 Genus 81 map R81.142 of type {16,48} Reflexible Genus 81 map R81.142* of type {48,16} Reflexible Group <384,136> Number of orientably-regular maps = 2 Genus 69 map R69.20 of type {8,48} Reflexible Genus 69 map R69.20* of type {48,8} Reflexible Group <384,138> Number of orientably-regular maps = 2 Genus 69 map R69.24 of type {8,48} Reflexible Genus 69 map R69.24* of type {48,8} Reflexible Group <384,144> Number of orientably-regular maps = 2 Genus 69 map R69.26 of type {8,48} Reflexible Genus 69 map R69.26* of type {48,8} Reflexible Group <384,145> Number of orientably-regular maps = 2 Genus 69 map R69.25 of type {8,48} Reflexible Genus 69 map R69.25* of type {48,8} Reflexible Group <384,146> Number of orientably-regular maps = 2 Genus 81 map R81.137 of type {16,48} Reflexible Genus 81 map R81.137* of type {48,16} Reflexible Group <384,147> Number of orientably-regular maps = 2 Genus 81 map R81.136 of type {16,48} Reflexible Genus 81 map R81.136* of type {48,16} Reflexible Group <384,153> Number of orientably-regular maps = 2 Genus 75 map R75.12 of type {12,32} Reflexible Genus 75 map R75.12* of type {32,12} Reflexible Group <384,156> Number of orientably-regular maps = 2 Genus 75 map R75.13 of type {12,32} Reflexible Genus 75 map R75.13* of type {32,12} Reflexible Group <384,159> Number of orientably-regular maps = 2 Genus 83 map R83.11 of type {24,32} Reflexible Genus 83 map R83.11* of type {32,24} Reflexible Group <384,161> Number of orientably-regular maps = 2 Genus 83 map R83.12 of type {24,32} Reflexible Genus 83 map R83.12* of type {32,24} Reflexible Group <384,170> Number of orientably-regular maps = 2 Genus 89 map R89.53 of type {32,96} Reflexible Genus 89 map R89.53* of type {96,32} Reflexible Group <384,171> Number of orientably-regular maps = 2 Genus 89 map R89.54 of type {32,96} Reflexible Genus 89 map R89.54* of type {96,32} Reflexible Group <384,172> Number of orientably-regular maps = 2 Genus 47 map R47.1 of type {4,96} Reflexible Genus 47 map R47.1* of type {96,4} Reflexible Group <384,174> Number of orientably-regular maps = 2 Genus 71 map R71.14 of type {8,96} Reflexible Genus 71 map R71.14* of type {96,8} Reflexible Group <384,178> Number of orientably-regular maps = 2 Genus 89 map R89.56 of type {32,96} Reflexible Genus 89 map R89.56* of type {96,32} Reflexible Group <384,179> Number of orientably-regular maps = 2 Genus 89 map R89.55 of type {32,96} Reflexible Genus 89 map R89.55* of type {96,32} Reflexible Group <384,180> Number of orientably-regular maps = 2 Genus 71 map R71.13 of type {8,96} Reflexible Genus 71 map R71.13* of type {96,8} Reflexible Group <384,182> Number of orientably-regular maps = 2 Genus 47 map R47.2 of type {4,96} Reflexible Genus 47 map R47.2* of type {96,4} Reflexible Group <384,183> Number of orientably-regular maps = 2 Genus 62 map R62.3 of type {6,64} Reflexible Genus 62 map R62.3* of type {64,6} Reflexible Group <384,185> Number of orientably-regular maps = 2 Genus 78 map R78.11 of type {12,64} Reflexible Genus 78 map R78.11* of type {64,12} Reflexible Group <384,406> Number of orientably-regular maps = 1 Genus 81 map R81.163 of type {24,24} Reflexible Self-dual Group <384,450> Number of orientably-regular maps = 1 Genus 89 map R89.66 of type {48,48} Reflexible Self-dual Group <384,451> Number of orientably-regular maps = 1 Genus 89 map R89.65 of type {48,48} Reflexible Self-dual Group <384,452> Number of orientably-regular maps = 1 Genus 81 map R81.166 of type {24,24} Reflexible Self-dual Group <384,454> Number of orientably-regular maps = 1 Genus 81 map R81.165 of type {24,24} Reflexible Self-dual Group <384,456> Number of orientably-regular maps = 1 Genus 89 map R89.67 of type {48,48} Reflexible Self-dual Group <384,457> Number of orientably-regular maps = 1 Genus 89 map R89.68 of type {48,48} Reflexible Self-dual Group <384,465> Number of orientably-regular maps = 2 Genus 89 map R89.61 of type {48,48} Reflexible Non-self-dual Genus 89 map R89.61* of type {48,48} Reflexible Non-self-dual Group <384,466> Number of orientably-regular maps = 2 Genus 89 map R89.62 of type {48,48} Reflexible Non-self-dual Genus 89 map R89.62* of type {48,48} Reflexible Non-self-dual Group <384,467> Number of orientably-regular maps = 2 Genus 85 map R85.63 of type {24,48} Reflexible Genus 85 map R85.63* of type {48,24} Reflexible Group <384,469> Number of orientably-regular maps = 2 Genus 85 map R85.64 of type {24,48} Reflexible Genus 85 map R85.64* of type {48,24} Reflexible Group <384,471> Number of orientably-regular maps = 2 Genus 85 map R85.59 of type {24,48} Reflexible Genus 85 map R85.59* of type {48,24} Reflexible Group <384,472> Number of orientably-regular maps = 2 Genus 85 map R85.60 of type {24,48} Reflexible Genus 85 map R85.60* of type {48,24} Reflexible Group <384,475> Number of orientably-regular maps = 2 Genus 77 map R77.21 of type {12,48} Reflexible Genus 77 map R77.21* of type {48,12} Reflexible Group <384,477> Number of orientably-regular maps = 2 Genus 85 map R85.62 of type {24,48} Reflexible Genus 85 map R85.62* of type {48,24} Reflexible Group <384,479> Number of orientably-regular maps = 2 Genus 73 map R73.98 of type {12,24} Reflexible Genus 73 map R73.98* of type {24,12} Reflexible Group <384,481> Number of orientably-regular maps = 2 Genus 81 map R81.164 of type {24,24} Reflexible Non-self-dual Genus 81 map R81.164* of type {24,24} Reflexible Non-self-dual Group <384,483> Number of orientably-regular maps = 2 Genus 77 map R77.20 of type {12,48} Reflexible Genus 77 map R77.20* of type {48,12} Reflexible Group <384,485> Number of orientably-regular maps = 2 Genus 85 map R85.61 of type {24,48} Reflexible Genus 85 map R85.61* of type {48,24} Reflexible Group <384,491> Number of orientably-regular maps = 2 Genus 89 map C89.5 of type {48,48} Chiral Self-dual Genus 89 map C89.5# of type {48,48} Chiral Self-dual Group <384,493> Number of orientably-regular maps = 1 Genus 89 map R89.63 of type {48,48} Reflexible Self-dual Group <384,495> Number of orientably-regular maps = 1 Genus 89 map R89.64 of type {48,48} Reflexible Self-dual Group <384,496> Number of orientably-regular maps = 2 Genus 85 map R85.57 of type {24,48} Reflexible Genus 85 map R85.57* of type {48,24} Reflexible Group <384,497> Number of orientably-regular maps = 2 Genus 85 map R85.58 of type {24,48} Reflexible Genus 85 map R85.58* of type {48,24} Reflexible Group <384,535> Number of orientably-regular maps = 1 Genus 93 map R93.30 of type {96,96} Reflexible Self-dual Group <384,536> Number of orientably-regular maps = 1 Genus 93 map R93.32 of type {96,96} Reflexible Self-dual Group <384,537> Number of orientably-regular maps = 2 Genus 93 map R93.31 of type {96,96} Reflexible Non-self-dual Genus 93 map R93.31* of type {96,96} Reflexible Non-self-dual Group <384,538> Number of orientably-regular maps = 2 Genus 73 map R73.99 of type {12,24} Reflexible Genus 73 map R73.99* of type {24,12} Reflexible Group <384,539> Number of orientably-regular maps = 2 Genus 81 map R81.167 of type {24,24} Reflexible Non-self-dual Genus 81 map R81.167* of type {24,24} Reflexible Non-self-dual Group <384,540> Number of orientably-regular maps = 2 Genus 73 map R73.100 of type {12,24} Reflexible Genus 73 map R73.100* of type {24,12} Reflexible Group <384,541> Number of orientably-regular maps = 2 Genus 81 map R81.168 of type {24,24} Reflexible Non-self-dual Genus 81 map R81.168* of type {24,24} Reflexible Non-self-dual Group <384,542> Number of orientably-regular maps = 2 Genus 73 map R73.101 of type {12,24} Reflexible Genus 73 map R73.101* of type {24,12} Reflexible Group <384,544> Number of orientably-regular maps = 1 Genus 65 map R65.125 of type {12,12} Reflexible Self-dual Group <384,546> Number of orientably-regular maps = 1 Genus 81 map R81.169 of type {24,24} Reflexible Self-dual Group <384,551> Number of orientably-regular maps = 2 Genus 79 map R79.15 of type {12,96} Reflexible Genus 79 map R79.15* of type {96,12} Reflexible Group <384,553> Number of orientably-regular maps = 2 Genus 87 map R87.12 of type {24,96} Reflexible Genus 87 map R87.12* of type {96,24} Reflexible Group <384,554> Number of orientably-regular maps = 2 Genus 79 map R79.14 of type {12,96} Reflexible Genus 79 map R79.14* of type {96,12} Reflexible Group <384,555> Number of orientably-regular maps = 2 Genus 87 map R87.13 of type {24,96} Reflexible Genus 87 map R87.13* of type {96,24} Reflexible Group <384,563> Number of orientably-regular maps = 1 Genus 95 map R95.19 of type {192,192} Reflexible Self-dual Group <384,564> Number of orientably-regular maps = 1 Genus 95 map R95.18 of type {192,192} Reflexible Self-dual Group <384,565> Number of orientably-regular maps = 2 Genus 64 map R64.22 of type {6,192} Reflexible Genus 64 map R64.22* of type {192,6} Reflexible Group <384,566> Number of orientably-regular maps = 2 Genus 80 map R80.8 of type {12,192} Reflexible Genus 80 map R80.8* of type {192,12} Reflexible Group <384,568> Number of orientably-regular maps = 2 Genus 21 map R21.1 of type {3,16} Reflexible Genus 21 map R21.1* of type {16,3} Reflexible Group <384,570> Number of orientably-regular maps = 8 Genus 21 map R21.2 of type {3,16} Reflexible Genus 21 map R21.2* of type {16,3} Reflexible Genus 53 map R53.8 of type {6,16} Reflexible Genus 53 map R53.8* of type {16,6} Reflexible Genus 69 map R69.31 of type {12,16} Reflexible Genus 69 map R69.31* of type {16,12} Reflexible Genus 69 map R69.32 of type {12,16} Reflexible Genus 69 map R69.32* of type {16,12} Reflexible Group <384,591> Number of orientably-regular maps = 1 Genus 33 map R33.36 of type {6,6} Reflexible Self-dual Group <384,595> Number of orientably-regular maps = 2 Genus 1 map R1.12 of type {3,6} Reflexible Genus 1 map R1.12* of type {6,3} Reflexible Group <384,600> Number of orientably-regular maps = 2 Genus 81 map R81.160 of type {24,24} Reflexible Self-dual Genus 81 map R81.161 of type {24,24} Reflexible Self-dual Group <384,601> Number of orientably-regular maps = 2 Genus 81 map R81.155 of type {24,24} Reflexible Self-dual Genus 81 map R81.158 of type {24,24} Reflexible Self-dual Group <384,602> Number of orientably-regular maps = 4 Genus 65 map R65.113 of type {12,12} Reflexible Self-dual Genus 65 map R65.114 of type {12,12} Reflexible Self-dual Genus 65 map R65.115 of type {12,12} Reflexible Self-dual Genus 65 map R65.116 of type {12,12} Reflexible Self-dual Group <384,603> Number of orientably-regular maps = 4 Genus 81 map R81.156 of type {24,24} Reflexible Self-dual Genus 81 map R81.157 of type {24,24} Reflexible Self-dual Genus 81 map R81.159 of type {24,24} Reflexible Self-dual Genus 81 map R81.162 of type {24,24} Reflexible Self-dual Group <384,608> Number of orientably-regular maps = 8 Genus 25 map R25.4 of type {3,24} Reflexible Genus 25 map R25.4* of type {24,3} Reflexible Genus 57 map R57.19 of type {6,24} Reflexible Genus 57 map R57.19* of type {24,6} Reflexible Genus 73 map R73.96 of type {12,24} Reflexible Genus 73 map R73.96* of type {24,12} Reflexible Genus 73 map R73.97 of type {12,24} Reflexible Genus 73 map R73.97* of type {24,12} Reflexible Group <384,617> Number of orientably-regular maps = 8 Genus 49 map R49.43 of type {6,12} Reflexible Genus 49 map R49.43* of type {12,6} Reflexible Genus 49 map R49.44 of type {6,12} Reflexible Genus 49 map R49.44* of type {12,6} Reflexible Genus 33 map C33.5 of type {6,6} Chiral Self-dual Genus 33 map C33.5# of type {6,6} Chiral Self-dual Genus 65 map C65.17 of type {12,12} Chiral Self-dual Genus 65 map C65.17# of type {12,12} Chiral Self-dual Group <384,619> Number of orientably-regular maps = 2 Genus 93 map R93.28 of type {96,96} Reflexible Self-dual Genus 93 map R93.29 of type {96,96} Reflexible Self-dual Group <384,620> Number of orientably-regular maps = 2 Genus 93 map R93.27 of type {96,96} Reflexible Non-self-dual Genus 93 map R93.27* of type {96,96} Reflexible Non-self-dual Group <384,5557> Number of orientably-regular maps = 2 Genus 57 map R57.20 of type {8,12} Reflexible Genus 57 map R57.20* of type {12,8} Reflexible Group <384,5558> Number of orientably-regular maps = 2 Genus 57 map R57.22 of type {8,12} Reflexible Genus 57 map R57.22* of type {12,8} Reflexible Group <384,5560> Number of orientably-regular maps = 2 Genus 41 map R41.26 of type {6,8} Reflexible Genus 41 map R41.26* of type {8,6} Reflexible Group <384,5561> Number of orientably-regular maps = 2 Genus 41 map R41.28 of type {6,8} Reflexible Genus 41 map R41.28* of type {8,6} Reflexible Group <384,5563> Number of orientably-regular maps = 2 Genus 57 map R57.21 of type {8,12} Reflexible Genus 57 map R57.21* of type {12,8} Reflexible Group <384,5564> Number of orientably-regular maps = 2 Genus 57 map R57.23 of type {8,12} Reflexible Genus 57 map R57.23* of type {12,8} Reflexible Group <384,5566> Number of orientably-regular maps = 2 Genus 33 map R33.19 of type {4,12} Reflexible Genus 33 map R33.19* of type {12,4} Reflexible Group <384,5567> Number of orientably-regular maps = 2 Genus 33 map R33.20 of type {4,12} Reflexible Genus 33 map R33.20* of type {12,4} Reflexible Group <384,5569> Number of orientably-regular maps = 2 Genus 57 map R57.30 of type {8,12} Reflexible Genus 57 map R57.30* of type {12,8} Reflexible Group <384,5570> Number of orientably-regular maps = 2 Genus 57 map R57.33 of type {8,12} Reflexible Genus 57 map R57.33* of type {12,8} Reflexible Group <384,5572> Number of orientably-regular maps = 2 Genus 57 map R57.31 of type {8,12} Reflexible Genus 57 map R57.31* of type {12,8} Reflexible Group <384,5573> Number of orientably-regular maps = 2 Genus 57 map R57.32 of type {8,12} Reflexible Genus 57 map R57.32* of type {12,8} Reflexible Group <384,5575> Number of orientably-regular maps = 2 Genus 41 map R41.31 of type {6,8} Reflexible Genus 41 map R41.31* of type {8,6} Reflexible Group <384,5576> Number of orientably-regular maps = 2 Genus 41 map R41.29 of type {6,8} Reflexible Genus 41 map R41.29* of type {8,6} Reflexible Group <384,5578> Number of orientably-regular maps = 2 Genus 57 map R57.26 of type {8,12} Reflexible Genus 57 map R57.26* of type {12,8} Reflexible Group <384,5579> Number of orientably-regular maps = 2 Genus 57 map R57.27 of type {8,12} Reflexible Genus 57 map R57.27* of type {12,8} Reflexible Group <384,5581> Number of orientably-regular maps = 2 Genus 41 map R41.24 of type {6,8} Reflexible Genus 41 map R41.24* of type {8,6} Reflexible Group <384,5582> Number of orientably-regular maps = 2 Genus 41 map R41.23 of type {6,8} Reflexible Genus 41 map R41.23* of type {8,6} Reflexible Group <384,5593> Number of orientably-regular maps = 2 Genus 65 map R65.90 of type {8,24} Reflexible Genus 65 map R65.90* of type {24,8} Reflexible Group <384,5594> Number of orientably-regular maps = 2 Genus 65 map R65.91 of type {8,24} Reflexible Genus 65 map R65.91* of type {24,8} Reflexible Group <384,5595> Number of orientably-regular maps = 2 Genus 65 map R65.94 of type {8,24} Reflexible Genus 65 map R65.94* of type {24,8} Reflexible Group <384,5596> Number of orientably-regular maps = 2 Genus 65 map R65.95 of type {8,24} Reflexible Genus 65 map R65.95* of type {24,8} Reflexible Group <384,5597> Number of orientably-regular maps = 2 Genus 65 map R65.88 of type {8,24} Reflexible Genus 65 map R65.88* of type {24,8} Reflexible Group <384,5598> Number of orientably-regular maps = 2 Genus 65 map R65.89 of type {8,24} Reflexible Genus 65 map R65.89* of type {24,8} Reflexible Group <384,5599> Number of orientably-regular maps = 2 Genus 65 map R65.93 of type {8,24} Reflexible Genus 65 map R65.93* of type {24,8} Reflexible Group <384,5600> Number of orientably-regular maps = 2 Genus 65 map R65.92 of type {8,24} Reflexible Genus 65 map R65.92* of type {24,8} Reflexible Group <384,5602> Number of orientably-regular maps = 4 Genus 17 map R17.3 of type {4,6} Reflexible Genus 17 map R17.3* of type {6,4} Reflexible Genus 41 map R41.32 of type {6,8} Reflexible Genus 41 map R41.32* of type {8,6} Reflexible Group <384,5603> Number of orientably-regular maps = 2 Genus 41 map R41.30 of type {6,8} Reflexible Genus 41 map R41.30* of type {8,6} Reflexible Group <384,5604> Number of orientably-regular maps = 2 Genus 17 map R17.4 of type {4,6} Reflexible Genus 17 map R17.4* of type {6,4} Reflexible Group <384,5606> Number of orientably-regular maps = 2 Genus 57 map R57.29 of type {8,12} Reflexible Genus 57 map R57.29* of type {12,8} Reflexible Group <384,5607> Number of orientably-regular maps = 2 Genus 33 map R33.18 of type {4,12} Reflexible Genus 33 map R33.18* of type {12,4} Reflexible Group <384,5608> Number of orientably-regular maps = 4 Genus 33 map R33.17 of type {4,12} Reflexible Genus 33 map R33.17* of type {12,4} Reflexible Genus 57 map R57.28 of type {8,12} Reflexible Genus 57 map R57.28* of type {12,8} Reflexible Group <384,5609> Number of orientably-regular maps = 2 Genus 81 map R81.130 of type {16,48} Reflexible Genus 81 map R81.130* of type {48,16} Reflexible Group <384,5610> Number of orientably-regular maps = 2 Genus 81 map R81.131 of type {16,48} Reflexible Genus 81 map R81.131* of type {48,16} Reflexible Group <384,5611> Number of orientably-regular maps = 2 Genus 45 map R45.7 of type {4,48} Reflexible Genus 45 map R45.7* of type {48,4} Reflexible Group <384,5612> Number of orientably-regular maps = 2 Genus 45 map R45.6 of type {4,48} Reflexible Genus 45 map R45.6* of type {48,4} Reflexible Group <384,5614> Number of orientably-regular maps = 2 Genus 81 map R81.132 of type {16,48} Reflexible Genus 81 map R81.132* of type {48,16} Reflexible Group <384,5615> Number of orientably-regular maps = 2 Genus 81 map R81.133 of type {16,48} Reflexible Genus 81 map R81.133* of type {48,16} Reflexible Group <384,5616> Number of orientably-regular maps = 2 Genus 69 map R69.18 of type {8,48} Reflexible Genus 69 map R69.18* of type {48,8} Reflexible Group <384,5617> Number of orientably-regular maps = 2 Genus 69 map R69.17 of type {8,48} Reflexible Genus 69 map R69.17* of type {48,8} Reflexible Group <384,5622> Number of orientably-regular maps = 2 Genus 57 map R57.34 of type {8,12} Reflexible Genus 57 map R57.34* of type {12,8} Reflexible Group <384,5624> Number of orientably-regular maps = 2 Genus 41 map R41.27 of type {6,8} Reflexible Genus 41 map R41.27* of type {8,6} Reflexible Group <384,5625> Number of orientably-regular maps = 2 Genus 33 map R33.21 of type {4,12} Reflexible Genus 33 map R33.21* of type {12,4} Reflexible Group <384,5629> Number of orientably-regular maps = 2 Genus 57 map R57.36 of type {8,12} Reflexible Genus 57 map R57.36* of type {12,8} Reflexible Group <384,5641> Number of orientably-regular maps = 2 Genus 57 map R57.24 of type {8,12} Reflexible Genus 57 map R57.24* of type {12,8} Reflexible Group <384,5649> Number of orientably-regular maps = 2 Genus 33 map R33.23 of type {4,12} Reflexible Genus 33 map R33.23* of type {12,4} Reflexible Group <384,5650> Number of orientably-regular maps = 2 Genus 57 map R57.35 of type {8,12} Reflexible Genus 57 map R57.35* of type {12,8} Reflexible Group <384,5654> Number of orientably-regular maps = 2 Genus 33 map R33.22 of type {4,12} Reflexible Genus 33 map R33.22* of type {12,4} Reflexible Group <384,5657> Number of orientably-regular maps = 2 Genus 17 map R17.5 of type {4,6} Reflexible Genus 17 map R17.5* of type {6,4} Reflexible Group <384,5660> Number of orientably-regular maps = 2 Genus 41 map R41.25 of type {6,8} Reflexible Genus 41 map R41.25* of type {8,6} Reflexible Group <384,5664> Number of orientably-regular maps = 2 Genus 41 map R41.33 of type {6,8} Reflexible Genus 41 map R41.33* of type {8,6} Reflexible Group <384,5668> Number of orientably-regular maps = 2 Genus 57 map R57.37 of type {8,12} Reflexible Genus 57 map R57.37* of type {12,8} Reflexible Group <384,5672> Number of orientably-regular maps = 2 Genus 57 map R57.38 of type {8,12} Reflexible Genus 57 map R57.38* of type {12,8} Reflexible Group <384,5676> Number of orientably-regular maps = 2 Genus 57 map R57.25 of type {8,12} Reflexible Genus 57 map R57.25* of type {12,8} Reflexible Group <384,5677> Number of orientably-regular maps = 4 Genus 17 map C17.2 of type {4,6} Chiral Genus 17 map C17.2# of type {4,6} Chiral Genus 17 map C17.2* of type {6,4} Chiral Genus 17 map C17.2*# of type {6,4} Chiral Group <384,5678> Number of orientably-regular maps = 4 Genus 41 map C41.12 of type {6,8} Chiral Genus 41 map C41.12# of type {6,8} Chiral Genus 41 map C41.12* of type {8,6} Chiral Genus 41 map C41.12*# of type {8,6} Chiral Group <384,5688> Number of orientably-regular maps = 2 Genus 65 map R65.96 of type {8,24} Reflexible Genus 65 map R65.96* of type {24,8} Reflexible Group <384,5689> Number of orientably-regular maps = 2 Genus 41 map R41.7 of type {4,24} Reflexible Genus 41 map R41.7* of type {24,4} Reflexible Group <384,5692> Number of orientably-regular maps = 2 Genus 65 map R65.97 of type {8,24} Reflexible Genus 65 map R65.97* of type {24,8} Reflexible Group <384,5693> Number of orientably-regular maps = 2 Genus 41 map R41.8 of type {4,24} Reflexible Genus 41 map R41.8* of type {24,4} Reflexible Group <384,5703> Number of orientably-regular maps = 2 Genus 41 map R41.9 of type {4,24} Reflexible Genus 41 map R41.9* of type {24,4} Reflexible Group <384,5704> Number of orientably-regular maps = 2 Genus 65 map R65.99 of type {8,24} Reflexible Genus 65 map R65.99* of type {24,8} Reflexible Group <384,5707> Number of orientably-regular maps = 2 Genus 41 map R41.10 of type {4,24} Reflexible Genus 41 map R41.10* of type {24,4} Reflexible Group <384,5708> Number of orientably-regular maps = 2 Genus 65 map R65.98 of type {8,24} Reflexible Genus 65 map R65.98* of type {24,8} Reflexible Group <384,5709> Number of orientably-regular maps = 2 Genus 53 map R53.6 of type {6,16} Reflexible Genus 53 map R53.6* of type {16,6} Reflexible Group <384,5711> Number of orientably-regular maps = 2 Genus 69 map R69.29 of type {12,16} Reflexible Genus 69 map R69.29* of type {16,12} Reflexible Group <384,5713> Number of orientably-regular maps = 2 Genus 69 map R69.30 of type {12,16} Reflexible Genus 69 map R69.30* of type {16,12} Reflexible Group <384,5715> Number of orientably-regular maps = 2 Genus 53 map R53.7 of type {6,16} Reflexible Genus 53 map R53.7* of type {16,6} Reflexible Group <384,5744> Number of orientably-regular maps = 1 Genus 65 map R65.119 of type {12,12} Reflexible Self-dual Group <384,5749> Number of orientably-regular maps = 2 Genus 65 map R65.120 of type {12,12} Reflexible Non-self-dual Genus 65 map R65.120* of type {12,12} Reflexible Non-self-dual Group <384,5751> Number of orientably-regular maps = 1 Genus 65 map R65.121 of type {12,12} Reflexible Self-dual Group <384,5755> Number of orientably-regular maps = 2 Genus 65 map C65.15 of type {12,12} Chiral Self-dual Genus 65 map C65.15# of type {12,12} Chiral Self-dual Group <384,5757> Number of orientably-regular maps = 2 Genus 49 map R49.45 of type {6,12} Reflexible Genus 49 map R49.45* of type {12,6} Reflexible Group <384,5760> Number of orientably-regular maps = 2 Genus 49 map R49.40 of type {6,12} Reflexible Genus 49 map R49.40* of type {12,6} Reflexible Group <384,5763> Number of orientably-regular maps = 2 Genus 49 map R49.48 of type {6,12} Reflexible Genus 49 map R49.48* of type {12,6} Reflexible Group <384,5767> Number of orientably-regular maps = 1 Genus 33 map R33.34 of type {6,6} Reflexible Self-dual Group <384,5768> Number of orientably-regular maps = 1 Genus 65 map R65.118 of type {12,12} Reflexible Self-dual Group <384,5772> Number of orientably-regular maps = 2 Genus 33 map R33.32 of type {6,6} Reflexible Non-self-dual Genus 33 map R33.32* of type {6,6} Reflexible Non-self-dual Group <384,5773> Number of orientably-regular maps = 2 Genus 65 map R65.124 of type {12,12} Reflexible Non-self-dual Genus 65 map R65.124* of type {12,12} Reflexible Non-self-dual Group <384,5775> Number of orientably-regular maps = 2 Genus 33 map C33.4 of type {6,6} Chiral Self-dual Genus 33 map C33.4# of type {6,6} Chiral Self-dual Group <384,5776> Number of orientably-regular maps = 2 Genus 65 map C65.16 of type {12,12} Chiral Self-dual Genus 65 map C65.16# of type {12,12} Chiral Self-dual Group <384,5781> Number of orientably-regular maps = 4 Genus 49 map C49.7 of type {6,12} Chiral Genus 49 map C49.7# of type {6,12} Chiral Genus 49 map C49.7* of type {12,6} Chiral Genus 49 map C49.7*# of type {12,6} Chiral Group <384,5783> Number of orientably-regular maps = 4 Genus 49 map C49.6 of type {6,12} Chiral Genus 49 map C49.6# of type {6,12} Chiral Genus 49 map C49.6* of type {12,6} Chiral Genus 49 map C49.6*# of type {12,6} Chiral Group <384,5790> Number of orientably-regular maps = 2 Genus 49 map R49.39 of type {6,12} Reflexible Genus 49 map R49.39* of type {12,6} Reflexible Group <384,5794> Number of orientably-regular maps = 2 Genus 49 map R49.46 of type {6,12} Reflexible Genus 49 map R49.46* of type {12,6} Reflexible Group <384,5797> Number of orientably-regular maps = 2 Genus 49 map R49.47 of type {6,12} Reflexible Genus 49 map R49.47* of type {12,6} Reflexible Group <384,5803> Number of orientably-regular maps = 1 Genus 81 map R81.149 of type {24,24} Reflexible Self-dual Group <384,5804> Number of orientably-regular maps = 1 Genus 81 map R81.150 of type {24,24} Reflexible Self-dual Group <384,5805> Number of orientably-regular maps = 1 Genus 65 map R65.123 of type {12,12} Reflexible Self-dual Group <384,5806> Number of orientably-regular maps = 1 Genus 65 map R65.122 of type {12,12} Reflexible Self-dual Group <384,5807> Number of orientably-regular maps = 1 Genus 81 map R81.148 of type {24,24} Reflexible Self-dual Group <384,5809> Number of orientably-regular maps = 1 Genus 81 map R81.147 of type {24,24} Reflexible Self-dual Group <384,5811> Number of orientably-regular maps = 2 Genus 73 map R73.89 of type {12,24} Reflexible Genus 73 map R73.89* of type {24,12} Reflexible Group <384,5813> Number of orientably-regular maps = 2 Genus 73 map R73.90 of type {12,24} Reflexible Genus 73 map R73.90* of type {24,12} Reflexible Group <384,5815> Number of orientably-regular maps = 2 Genus 73 map R73.92 of type {12,24} Reflexible Genus 73 map R73.92* of type {24,12} Reflexible Group <384,5816> Number of orientably-regular maps = 2 Genus 73 map R73.91 of type {12,24} Reflexible Genus 73 map R73.91* of type {24,12} Reflexible Group <384,5827> Number of orientably-regular maps = 1 Genus 81 map R81.154 of type {24,24} Reflexible Self-dual Group <384,5828> Number of orientably-regular maps = 1 Genus 81 map R81.153 of type {24,24} Reflexible Self-dual Group <384,5831> Number of orientably-regular maps = 1 Genus 81 map R81.152 of type {24,24} Reflexible Self-dual Group <384,5832> Number of orientably-regular maps = 1 Genus 81 map R81.151 of type {24,24} Reflexible Self-dual Group <384,5833> Number of orientably-regular maps = 1 Genus 33 map R33.35 of type {6,6} Reflexible Self-dual Group <384,5834> Number of orientably-regular maps = 1 Genus 65 map R65.112 of type {12,12} Reflexible Self-dual Group <384,5835> Number of orientably-regular maps = 2 Genus 49 map R49.41 of type {6,12} Reflexible Genus 49 map R49.41* of type {12,6} Reflexible Group <384,5836> Number of orientably-regular maps = 2 Genus 49 map R49.42 of type {6,12} Reflexible Genus 49 map R49.42* of type {12,6} Reflexible Group <384,5837> Number of orientably-regular maps = 1 Genus 33 map R33.33 of type {6,6} Reflexible Self-dual Group <384,5838> Number of orientably-regular maps = 1 Genus 65 map R65.117 of type {12,12} Reflexible Self-dual Group <384,5839> Number of orientably-regular maps = 2 Genus 57 map R57.18 of type {6,24} Reflexible Genus 57 map R57.18* of type {24,6} Reflexible Group <384,5841> Number of orientably-regular maps = 2 Genus 73 map R73.93 of type {12,24} Reflexible Genus 73 map R73.93* of type {24,12} Reflexible Group <384,5846> Number of orientably-regular maps = 2 Genus 73 map R73.95 of type {12,24} Reflexible Genus 73 map R73.95* of type {24,12} Reflexible Group <384,5847> Number of orientably-regular maps = 2 Genus 73 map R73.94 of type {12,24} Reflexible Genus 73 map R73.94* of type {24,12} Reflexible Group <384,5849> Number of orientably-regular maps = 1 Genus 89 map R89.57 of type {48,48} Reflexible Self-dual Group <384,5850> Number of orientably-regular maps = 1 Genus 89 map R89.58 of type {48,48} Reflexible Self-dual Group <384,5851> Number of orientably-regular maps = 1 Genus 89 map R89.59 of type {48,48} Reflexible Self-dual Group <384,5852> Number of orientably-regular maps = 1 Genus 89 map R89.60 of type {48,48} Reflexible Self-dual Group <384,5853> Number of orientably-regular maps = 2 Genus 61 map R61.18 of type {6,48} Reflexible Genus 61 map R61.18* of type {48,6} Reflexible Group <384,5854> Number of orientably-regular maps = 2 Genus 77 map R77.19 of type {12,48} Reflexible Genus 77 map R77.19* of type {48,12} Reflexible Group <384,5856> Number of orientably-regular maps = 2 Genus 77 map R77.18 of type {12,48} Reflexible Genus 77 map R77.18* of type {48,12} Reflexible Group <384,5857> Number of orientably-regular maps = 2 Genus 61 map R61.19 of type {6,48} Reflexible Genus 61 map R61.19* of type {48,6} Reflexible ............................................................................... Groups of order 386 Total = 2 Group <386,1> Number of orientably-regular maps = 2 Genus 0 map R0.192 of type {2,193} Reflexible Genus 0 map R0.192* of type {193,2} Reflexible Group <386,2> Number of orientably-regular maps = 2 Genus 96 map R96.27 of type {193,386} Reflexible Genus 96 map R96.27* of type {386,193} Reflexible ............................................................................... Groups of order 388 Total = 5 Group <388,2> Number of orientably-regular maps = 1 Genus 97 map R97.184 of type {388,388} Reflexible Self-dual Group <388,3> Number of orientably-regular maps = 2 Genus 1 map C1.44 of type {4,4} Chiral Self-dual Genus 1 map C1.44# of type {4,4} Chiral Self-dual Group <388,4> Number of orientably-regular maps = 2 Genus 0 map R0.193 of type {2,194} Reflexible Genus 0 map R0.193* of type {194,2} Reflexible Group <388,5> Number of orientably-regular maps = 1 Genus 96 map R96.28 of type {194,194} Reflexible Self-dual ............................................................................... Groups of order 390 Total = 12 Group <390,1> Number of orientably-regular maps = 4 Genus 79 map C79.13 of type {15,30} Chiral Genus 79 map C79.13# of type {15,30} Chiral Genus 79 map C79.13* of type {30,15} Chiral Genus 79 map C79.13*# of type {30,15} Chiral Group <390,3> Number of orientably-regular maps = 4 Genus 53 map C53.6 of type {6,15} Chiral Genus 53 map C53.6# of type {6,15} Chiral Genus 53 map C53.6* of type {15,6} Chiral Genus 53 map C53.6*# of type {15,6} Chiral Group <390,5> Number of orientably-regular maps = 2 Genus 91 map R91.60 of type {30,195} Reflexible Genus 91 map R91.60* of type {195,30} Reflexible Group <390,6> Number of orientably-regular maps = 2 Genus 95 map R95.16 of type {78,195} Reflexible Genus 95 map R95.16* of type {195,78} Reflexible Group <390,7> Number of orientably-regular maps = 2 Genus 65 map R65.63 of type {6,195} Reflexible Genus 65 map R65.63* of type {195,6} Reflexible Group <390,8> Number of orientably-regular maps = 2 Genus 96 map R96.26 of type {130,195} Reflexible Genus 96 map R96.26* of type {195,130} Reflexible Group <390,9> Number of orientably-regular maps = 2 Genus 78 map R78.10 of type {10,195} Reflexible Genus 78 map R78.10* of type {195,10} Reflexible Group <390,10> Number of orientably-regular maps = 2 Genus 90 map R90.12 of type {26,195} Reflexible Genus 90 map R90.12* of type {195,26} Reflexible Group <390,11> Number of orientably-regular maps = 2 Genus 0 map R0.194 of type {2,195} Reflexible Genus 0 map R0.194* of type {195,2} Reflexible Group <390,12> Number of orientably-regular maps = 2 Genus 97 map R97.182 of type {195,390} Reflexible Genus 97 map R97.182* of type {390,195} Reflexible ............................................................................... Groups of order 392 Total = 44 Group <392,2> Number of orientably-regular maps = 1 Genus 98 map R98.18 of type {392,392} Reflexible Self-dual Group <392,4> Number of orientably-regular maps = 2 Genus 49 map R49.31 of type {4,196} Reflexible Genus 49 map R49.31* of type {196,4} Reflexible Group <392,5> Number of orientably-regular maps = 2 Genus 0 map R0.195 of type {2,196} Reflexible Genus 0 map R0.195* of type {196,2} Reflexible Group <392,7> Number of orientably-regular maps = 2 Genus 48 map R48.2 of type {4,98} Reflexible Genus 48 map R48.2* of type {98,4} Reflexible Group <392,8> Number of orientably-regular maps = 1 Genus 97 map R97.183 of type {196,196} Reflexible Self-dual Group <392,9> Number of orientably-regular maps = 2 Genus 96 map R96.24 of type {98,196} Reflexible Genus 96 map R96.24* of type {196,98} Reflexible Group <392,11> Number of orientably-regular maps = 2 Genus 91 map C91.26 of type {49,49} Chiral Mirror-self-dual Genus 91 map C91.26# of type {49,49} Chiral Mirror-self-dual Group <392,19> Number of orientably-regular maps = 1 Genus 85 map R85.67 of type {28,28} Reflexible Self-dual Group <392,21> Number of orientably-regular maps = 2 Genus 78 map R78.12 of type {14,28} Reflexible Genus 78 map R78.12* of type {28,14} Reflexible Group <392,24> Number of orientably-regular maps = 2 Genus 85 map R85.66 of type {28,28} Reflexible Non-self-dual Genus 85 map R85.66* of type {28,28} Reflexible Non-self-dual Group <392,25> Number of orientably-regular maps = 2 Genus 78 map R78.14 of type {14,28} Reflexible Genus 78 map R78.14* of type {28,14} Reflexible Group <392,27> Number of orientably-regular maps = 2 Genus 78 map R78.13 of type {14,28} Reflexible Genus 78 map R78.13* of type {28,14} Reflexible Group <392,36> Number of orientably-regular maps = 2 Genus 50 map R50.7 of type {8,8} Reflexible Non-self-dual Genus 50 map R50.7* of type {8,8} Reflexible Non-self-dual Group <392,37> Number of orientably-regular maps = 2 Genus 36 map R36.4 of type {4,14} Reflexible Genus 36 map R36.4* of type {14,4} Reflexible Group <392,40> Number of orientably-regular maps = 1 Genus 1 map R1.28 of type {4,4} Reflexible Self-dual ............................................................................... Groups of order 394 Total = 2 Group <394,1> Number of orientably-regular maps = 2 Genus 0 map R0.196 of type {2,197} Reflexible Genus 0 map R0.196* of type {197,2} Reflexible Group <394,2> Number of orientably-regular maps = 2 Genus 98 map R98.16 of type {197,394} Reflexible Genus 98 map R98.16* of type {394,197} Reflexible ............................................................................... Groups of order 396 Total = 30 Group <396,4> Number of orientably-regular maps = 1 Genus 99 map R99.43 of type {396,396} Reflexible Self-dual Group <396,5> Number of orientably-regular maps = 2 Genus 80 map R80.9 of type {18,22} Reflexible Genus 80 map R80.9* of type {22,18} Reflexible Group <396,6> Number of orientably-regular maps = 1 Genus 96 map R96.25 of type {99,99} Reflexible Self-dual Group <396,7> Number of orientably-regular maps = 2 Genus 88 map R88.15 of type {18,198} Reflexible Genus 88 map R88.15* of type {198,18} Reflexible Group <396,8> Number of orientably-regular maps = 2 Genus 90 map R90.11 of type {22,198} Reflexible Genus 90 map R90.11* of type {198,22} Reflexible Group <396,9> Number of orientably-regular maps = 2 Genus 0 map R0.197 of type {2,198} Reflexible Genus 0 map R0.197* of type {198,2} Reflexible Group <396,10> Number of orientably-regular maps = 1 Genus 98 map R98.17 of type {198,198} Reflexible Self-dual Group <396,17> Number of orientably-regular maps = 1 Genus 91 map R91.65 of type {44,44} Reflexible Self-dual Group <396,19> Number of orientably-regular maps = 2 Genus 64 map R64.19 of type {6,66} Reflexible Genus 64 map R64.19* of type {66,6} Reflexible Group <396,21> Number of orientably-regular maps = 1 Genus 94 map R94.20 of type {66,66} Reflexible Self-dual Group <396,22> Number of orientably-regular maps = 2 Genus 64 map R64.21 of type {6,66} Reflexible Genus 64 map R64.21* of type {66,6} Reflexible Group <396,26> Number of orientably-regular maps = 2 Genus 94 map R94.21 of type {66,66} Reflexible Non-self-dual Genus 94 map R94.21* of type {66,66} Reflexible Non-self-dual Group <396,27> Number of orientably-regular maps = 2 Genus 64 map R64.20 of type {6,66} Reflexible Genus 64 map R64.20* of type {66,6} Reflexible ............................................................................... Groups of order 398 Total = 2 Group <398,1> Number of orientably-regular maps = 2 Genus 0 map R0.198 of type {2,199} Reflexible Genus 0 map R0.198* of type {199,2} Reflexible Group <398,2> Number of orientably-regular maps = 2 Genus 99 map R99.40 of type {199,398} Reflexible Genus 99 map R99.40* of type {398,199} Reflexible ............................................................................... Groups of order 400 Total = 221 Group <400,2> Number of orientably-regular maps = 1 Genus 100 map R100.54 of type {400,400} Reflexible Self-dual Group <400,5> Number of orientably-regular maps = 2 Genus 75 map R75.11 of type {8,200} Reflexible Genus 75 map R75.11* of type {200,8} Reflexible Group <400,6> Number of orientably-regular maps = 2 Genus 75 map R75.10 of type {8,200} Reflexible Genus 75 map R75.10* of type {200,8} Reflexible Group <400,7> Number of orientably-regular maps = 2 Genus 50 map R50.3 of type {4,200} Reflexible Genus 50 map R50.3* of type {200,4} Reflexible Group <400,8> Number of orientably-regular maps = 2 Genus 0 map R0.199 of type {2,200} Reflexible Genus 0 map R0.199* of type {200,2} Reflexible Group <400,14> Number of orientably-regular maps = 2 Genus 49 map R49.30 of type {4,100} Reflexible Genus 49 map R49.30* of type {100,4} Reflexible Group <400,16> Number of orientably-regular maps = 2 Genus 72 map R72.5 of type {8,50} Reflexible Genus 72 map R72.5* of type {50,8} Reflexible Group <400,18> Number of orientably-regular maps = 2 Genus 74 map R74.6 of type {8,100} Reflexible Genus 74 map R74.6* of type {100,8} Reflexible Group <400,21> Number of orientably-regular maps = 1 Genus 97 map R97.181 of type {100,100} Reflexible Self-dual Group <400,23> Number of orientably-regular maps = 1 Genus 99 map R99.42 of type {200,200} Reflexible Self-dual Group <400,24> Number of orientably-regular maps = 1 Genus 99 map R99.41 of type {200,200} Reflexible Self-dual Group <400,25> Number of orientably-regular maps = 2 Genus 96 map R96.22 of type {50,200} Reflexible Genus 96 map R96.22* of type {200,50} Reflexible Group <400,26> Number of orientably-regular maps = 2 Genus 98 map R98.15 of type {100,200} Reflexible Genus 98 map R98.15* of type {200,100} Reflexible Group <400,28> Number of orientably-regular maps = 2 Genus 51 map C51.11 of type {8,8} Chiral Self-dual Genus 51 map C51.11# of type {8,8} Chiral Self-dual Group <400,29> Number of orientably-regular maps = 2 Genus 51 map C51.13 of type {8,8} Chiral Self-dual Genus 51 map C51.13# of type {8,8} Chiral Self-dual Group <400,34> Number of orientably-regular maps = 2 Genus 1 map C1.45 of type {4,4} Chiral Self-dual Genus 1 map C1.45# of type {4,4} Chiral Self-dual Group <400,52> Number of orientably-regular maps = 1 Genus 85 map R85.65 of type {25,25} Reflexible Self-dual Group <400,61> Number of orientably-regular maps = 1 Genus 91 map R91.63 of type {40,40} Reflexible Self-dual Group <400,63> Number of orientably-regular maps = 1 Genus 91 map R91.61 of type {40,40} Reflexible Self-dual Group <400,65> Number of orientably-regular maps = 2 Genus 76 map R76.24 of type {10,40} Reflexible Genus 76 map R76.24* of type {40,10} Reflexible Group <400,68> Number of orientably-regular maps = 2 Genus 86 map R86.11 of type {20,40} Reflexible Genus 86 map R86.11* of type {40,20} Reflexible Group <400,73> Number of orientably-regular maps = 1 Genus 81 map R81.145 of type {20,20} Reflexible Self-dual Group <400,76> Number of orientably-regular maps = 2 Genus 91 map R91.64 of type {40,40} Reflexible Non-self-dual Genus 91 map R91.64* of type {40,40} Reflexible Non-self-dual Group <400,77> Number of orientably-regular maps = 2 Genus 91 map R91.62 of type {40,40} Reflexible Non-self-dual Genus 91 map R91.62* of type {40,40} Reflexible Non-self-dual Group <400,78> Number of orientably-regular maps = 2 Genus 86 map R86.13 of type {20,40} Reflexible Genus 86 map R86.13* of type {40,20} Reflexible Group <400,79> Number of orientably-regular maps = 2 Genus 76 map R76.23 of type {10,40} Reflexible Genus 76 map R76.23* of type {40,10} Reflexible Group <400,86> Number of orientably-regular maps = 2 Genus 81 map R81.144 of type {20,20} Reflexible Non-self-dual Genus 81 map R81.144* of type {20,20} Reflexible Non-self-dual Group <400,87> Number of orientably-regular maps = 2 Genus 76 map R76.25 of type {10,40} Reflexible Genus 76 map R76.25* of type {40,10} Reflexible Group <400,89> Number of orientably-regular maps = 2 Genus 86 map R86.12 of type {20,40} Reflexible Genus 86 map R86.12* of type {40,20} Reflexible Group <400,118> Number of orientably-regular maps = 4 Genus 41 map C41.10 of type {4,20} Chiral Genus 41 map C41.10# of type {4,20} Chiral Genus 41 map C41.10* of type {20,4} Chiral Genus 41 map C41.10*# of type {20,4} Chiral Group <400,121> Number of orientably-regular maps = 4 Genus 71 map C71.7 of type {8,40} Chiral Genus 71 map C71.7# of type {8,40} Chiral Genus 71 map C71.7* of type {40,8} Chiral Genus 71 map C71.7*# of type {40,8} Chiral Group <400,123> Number of orientably-regular maps = 4 Genus 71 map C71.8 of type {8,40} Chiral Genus 71 map C71.8# of type {8,40} Chiral Genus 71 map C71.8* of type {40,8} Chiral Genus 71 map C71.8*# of type {40,8} Chiral Group <400,129> Number of orientably-regular maps = 2 Genus 41 map R41.6 of type {4,20} Reflexible Genus 41 map R41.6* of type {20,4} Reflexible Group <400,131> Number of orientably-regular maps = 2 Genus 56 map R56.9 of type {8,10} Reflexible Genus 56 map R56.9* of type {10,8} Reflexible Group <400,132> Number of orientably-regular maps = 2 Genus 66 map R66.7 of type {8,20} Reflexible Genus 66 map R66.7* of type {20,8} Reflexible Group <400,135> Number of orientably-regular maps = 2 Genus 91 map C91.24 of type {40,40} Chiral Self-dual Genus 91 map C91.24# of type {40,40} Chiral Self-dual Group <400,136> Number of orientably-regular maps = 2 Genus 91 map C91.25 of type {40,40} Chiral Self-dual Genus 91 map C91.25# of type {40,40} Chiral Self-dual Group <400,141> Number of orientably-regular maps = 2 Genus 81 map C81.39 of type {20,20} Chiral Self-dual Genus 81 map C81.39# of type {20,20} Chiral Self-dual Group <400,156> Number of orientably-regular maps = 1 Genus 51 map R51.17 of type {8,8} Reflexible Self-dual Group <400,157> Number of orientably-regular maps = 1 Genus 51 map R51.16 of type {8,8} Reflexible Self-dual Group <400,162> Number of orientably-regular maps = 1 Genus 1 map R1.29 of type {4,4} Reflexible Self-dual Group <400,206> Number of orientably-regular maps = 2 Genus 51 map C51.12 of type {8,8} Chiral Self-dual Genus 51 map C51.12# of type {8,8} Chiral Self-dual Group <400,208> Number of orientably-regular maps = 2 Genus 51 map C51.10 of type {8,8} Chiral Mirror-self-dual Genus 51 map C51.10# of type {8,8} Chiral Mirror-self-dual ...............................................................................