Hypermaps over non-abelian simple groups and strongly symmetric generating sets

Abstract

A generating pair x, y for a group G is said to be symmetric if there exists an automorphism x,y of G inverting both x and y, that is, xx,y=x-1 and yx,y=y-1. Similarly, a group G is said to be strongly symmetric if G can be generated with two elements and if all generating pairs of G are symmetric. In this paper we classify the finite strongly symmetric non-abelian simple groups. Combinatorially, these are the finite non-abelian simple groups G such that every orientably regular hypermap with monodromy group G is reflexible.