Dr Sina Ruth Greenwood

PhD

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Senior Lecturer

Research | Current

My current areas of research are continua theory and discrete dynamical systems. I am primarily interested in inverse limits of set-valued functions.

 

Postgraduate supervision

Projects on offer

  • Inverse limits of set-valued functions (generalised inverse limits)
  • Topics in topology

Selected publications and creative works (Research Outputs)

  • Greenwood, S., & Windelborn, B. (2018). Trees and generalised inverse limits on intervals. TOPOLOGY AND ITS APPLICATIONS, 249, 160-176. 10.1016/j.topol.2018.09.006
  • Greenwood, S., & Suabedissen, R. (2017). 2-manifolds and inverse limits of set-valued functions on intervals. Discrete and Continuous Dynamical Systems- Series A, 37 (11), 5693-5706. 10.3934/dcds.2017246
  • Greenwood, S., Kennedy, J., & Lockyer, M. (2017). Connectedness and inverse limits with set-valued functions on intervals. Topology and its Applications, 221, 69-90. 10.1016/j.topol.2017.01.011
    Other University of Auckland co-authors: Michael Lockyer
  • Greenwood, S., & Kennedy, J. (2017). Connected generalized inverse limits over intervals. Fundamenta Mathematicae, 236 (1), 1-43. 10.4064/fm241-4-2016
  • Greenwood, S., & McCluskey, A. (2016). Continuous functions on Hausdorff continua. Topology and its Applications, 212, 142-165. 10.1016/j.topol.2016.09.002
  • Gauld, D., & Greenwood, S. (2016). Manifold boundaries. Topology and its Applications, 207, 10-21. 10.1016/j.topol.2016.04.012
  • Greenwood, S., & Youl, S. (2015). A subsequence theorem for generalised inverse limits. Topology and its Applications, 183, 18-35. 10.1016/j.topol.2014.12.016
  • Greenwood, S., & Kennedy, J. (2014). Connectedness and Ingram-Mahavier products. Topology and its Applications, 166, 1-9. 10.1016/j.topol.2014.01.016

Identifiers

Contact details

Primary office location

SCIENCE CENTRE 303 - Bldg 303
Level 2, Room 246
38 PRINCES ST
AUCKLAND CENTRAL
AUCKLAND 1010
New Zealand

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