The unitary subgroups of group algebras of a class of finite 2-groups with derived subgroup of order 2

Abstract

Let p be a prime and F be a finite field of characteristic p. Suppose that FG is the group algebra of the finite p-group G over the field F. Let V(FG) denote the group of normalized units in FG and let V*(FG) denote the unitary subgroup of V(FG). If p is odd, then the order of V*(FG) is |F|(|G|-1)/2. However, the case when p=2 still is open. In this paper, the order of V*(FG) is computed when G is a nonabelian 2-group given by a central extension of the form 1 Z2n× Z2m G Z2× ·s× Z2 1 and G' Z2, n, m≥ 1. Further, a conjecture is confirmed, namely, the order of V*(FG) can be divisible by |F|12(|G|+|1(G)|)-1, where 1(G)=\g∈ G\ |\ g2=1\.