Anticommutativity of Symmetric Elements under Generalized Oriented Involutions

Abstract

Let R be a ring with char(R)≠2 whose unit group are denoted by U(R), G a group with involution *, and σ:G→U(R) a nontrivial group homomorphism, with ker\ σ=N, satisfying xx*∈ N for all x∈ G. Let RG be the group ring of G over R and define the involution σ* in RG by ( Σx∈ Gαxx)σ*=Σx∈ Gσ(x)αxx*. In this paper, we will classify the group rings RG such that S is anticommutative, where S is the largest subset of (RG)+=\ α∈ RG: ασ *=α\ that can satisfy anticommutativity under char(R)≠2.