| Speaker: Istvan Kovacs Affiliation: University of Primorska Time: 14:00 Tuesday, 11 September, 2018 Location: 303-257 |
| A regular map M is a 2-cell embedding of a connected graph into an orientable surface such that the group of all orientation-preserving automorphisms of M acts transitively on the set of all arcs. Such a map M is called a regular Cayley map for the finite group G if M is the embedding of a Cayley graph Cay(G,S) such that G induces a regular group of orientation-preserving map automorphisms. In this talk, I will present the complete classification of regular Cayley maps for dihedral groups. |