Simplicity of algebras via epsilon-strong systems

Abstract

We obtain sufficient criteria for simplicity of systems, that is, rings R that are equipped with a family of additive subgroups Rs, for s ∈ S, where S is a semigroup, satisfying R = Σs ∈ S Rs and Rs Rt ⊂eq Rst, for s,t ∈ S. These criteria are specialized to obtain sufficient criteria for simplicity of, what we call, s-unital epsilon-strong systems, that is systems where S is an inverse semigroup, R is coherent, in the sense that for all s,t ∈ S with s ≤ t, the inclusion Rs ⊂eq Rt holds, and for each s ∈ S, the Rs Rs*-Rs*Rs-bimodule Rs is s-unital. As an aplication of this, we obtain generalizations of recent criteria for simplicity of skew inverse semigroup rings, by Beuter, Goncalves, \"Oinert and Royer, and then, in turn, for Steinberg algebras, over non-commutative rings, by Brown, Farthing, Sims, Steinberg, Clark and Edie-Michel.