Totally 2-closed finite groups with trivial Fitting subgroup

Abstract

A group G is said to be totally 2-closed if in each of its faithful permutation representations, say on a set , G is the largest subgroup of Sym() which leaves invariant each of the G-orbits for the induced action on × . We prove that there are precisely 47 finite totally 2-closed groups with trivial Fitting subgroup. Each of these groups is a direct product of pairwise non-isomorphic sporadic simple groups, with the direct factors coming from the Janko groups J1, J3 and J4, together with Ly, Th and the Monster M. These are the first known examples of insoluble totally 2-closed groups. As a by-product of our methods, we develop several tools for studying 2-closures of transitive permutation groups -- a vital tool in the study of representations of finite groups as automorphism groups of digraphs. We also prove a dual to a 1939 theorem of Frucht from Algebraic Graph Theory.