Simplicity of partial skew group rings of abelian groups

Abstract

Let be a ring with local units, a set of local units for , an abelian group and α a partial action of by ideals of that contain local units and such that the partial skew group ring α is associative. We show that α is simple if and only if is -simple and the center of the corner eδ0 (α ) e δ0 is a field for all e∈ . We apply the result to characterize simplicity of partial skew group rings in two cases, namely for partial skew group rings arising from partial actions by clopen subsets of a compact set and partial actions on the set level.