Non-orientable regular maps with negative prime-power Euler characteristic

Abstract

In this paper we provide a classification of all regular maps on surfaces of Euler characteristic -rd for some odd prime r and integer d 1. Such maps are necessarily non-orientable, and the cases where d = 1 or 2 have been dealt with previously. This classification splits naturally into three parts, based on the nature of the automorphism group G of the map, and particularly the structure of its quotient G/O(G) where O(G) is the largest normal subgroup of G of odd order. In fact G/O(G) is isomorphic to either a 2-group (in which case G is soluble), or PSL(2,q) or PGL(2,q) where q is an odd prime power. The result is a collection of 18 non-empty families of regular maps, with conditions on the associated parameters.