Normal group algebras

Abstract

Let FG denote the group algebra of the group G over the field F with char(F)≠ 2. Given both a homomorphism σ:G→ \1\ and a group involution : G→ G, an oriented involution of FG is defined by α=αgg α=αgσ(g)g. In this paper, we determine the conditions under which the group algebra FG is normal, that is, conditions under which FG satisfies the -identity αα=αα. We prove that FG is normal if and only if the set of symmetric elements under is commutative.