A class of 2-groups admitting an action of the symmetric group of degree 3

Abstract

A biextraspecial group of rank m is an extension of a special 2-group Q of the form 22 + 2m by L L2(2), such that the 3-element from L acts on Q fixed-point-freely. Subgroups of this type appear in at least the sporadic groups J2, J3, McL, Suz, and Co1. In this paper we completely classify biextraspecial groups, namely, we show that the rank m must be even and for each such m there exist exactly two biextraspecial groups B(m) up to isomorphism where ∈+,-. We also prove that (B(m)) is an extension of the m-dimensional orthogonal GF(2)-space of type by the corresponding orthogonal group. The extension is non-split except in a few small cases.