Saxl graphs of primitive affine groups with sporadic point stabilisers

Abstract

Let G be a permutation group on a set . A base for G is a subset of whose pointwise stabiliser is trivial, and the base size of G is the minimal cardinality of a base. If G has base size 2, then the corresponding Saxl graph (G) has vertex set and two vertices are adjacent if they form a base for G. A recent conjecture of Burness and Giudici states that if G is a finite primitive permutation group with base size 2, then (G) has the property that every two vertices have a common neighbour. We investigate this conjecture when G is an affine group and a point stabiliser is an almost quasisimple group whose unique quasisimple subnormal subgroup is a covering group of a sporadic simple group. We verify the conjecture under this assumption, in all but ten cases.