On finite totally 2-closed groups

Abstract

An abstract group G is called totally 2-closed if H=H(2), for any set with G H≤ Sym(), where H(2), is the largest subgroup of Sym() whose orbits on × are the same orbits of H. In this paper, we classify the finite soluble totally 2-closed groups. We also prove that the Fitting subgroup of a totally 2-closed group is a totally 2-closed group. Finally, we prove that a finite insoluble totally 2-closed group G of minimal order with non-trivial Fitting subgroup has shape Z· X, with Z=Z(G) cyclic, and X is a finite group with a unique minimal normal subgroup, which is nonabelian.