This research monograph provides a self-contained approach to the
problem of determining the conditions under which a compact
bordered Klein surface S and a finite group G exist, such that G
acts as a group of automorphisms in S. The cases dealt with here
take G cyclic, abelian, nilpotent or supersoluble and S
hyperelliptic or with connected boundary. No advanced knowledge of
group theory or hyperbolic geometry is required and three
introductory chapters provide as much background as necessary on
non-euclidean crystallographic groups. The graduate reader thus
finds here an easy access to current research in this area as well
as several new results obtained by means of the same unified
approach.
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