Projective planes, Laguerre planes and generalized quadrangles that admit large groups of automorphisms (2018)
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Conference Contributions  OtherCollections
ANZSRC Fields of Research
49  Mathematical sciences::4904  Pure mathematics::490405  Group theory and generalisations49  Mathematical sciences::4904  Pure mathematics::490402  Algebraic and differential geometry
49  Mathematical sciences::4904  Pure mathematics::490412  Topology
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On the existence of topological ovals in flat projective planes
Polster, B.; Rosehr, N.; Steinke, G.F. (University of Canterbury. Dept. of Mathematics, 1996)We show that every flat projective plane contains topological ovals. This is achieved by completing certain closed partial ovals, the socalled quasiovals, to topological ovals. 
A family of 2dimensional Minkowski planes with small automorphism groups
Steinke, Günter F. (University of Canterbury. Dept. of Mathematics, 1994)This paper concerns 2dimensional (topological locally compact connected) Minkowski planes. It uses a construction of J. Jakóbowski [4] of Minkowski planes over halfordered fields and applies it to the field of reals. ... 
Central automorphisms of finite Laguerre planes
G.F. Steinke (University of Canterbury. Mathematics and Statistics, 2016)