On *-Clean Group Rings over SLC-groups

Abstract

The property of *-cleanness in group rings has been studied for some groups considering the classical involution, given by g*=g-1. A group is called an SLC-group if its quotient by its center is isomorphic to the Klein group; these groups are equipped with its own canonical involution, which usually does not coincide with the classical one. In this paper we study the *-cleanness of RG when G is an SLC-group, considering * as its canonical involution. In that context, we prove that if RG is *-clean then G is the direct product of Q8 and an abelian group with some extra properties and we find a converse for some specific cases, generalizing a result by Gao, Chen and Li for Q8.