C*-algebras of inverse semigroups: amenability and weak containment

Abstract

We argue that weak containment is an appropriate notion of amenability for inverse semigroups. Given an inverse semigroup S and a homomorphism φ of S onto a group G, we show, under an assumption on (φ), that S has weak containment if and only if G is amenable and (φ) has weak containment. Using Fell bundle amenability, we find a related result for inverse semigroups with zero. We show that all graph inverse semigroups have weak containment and that Nica's inverse semigroup G,P of a quasi-lattice ordered group (G,P) has weak containment if and only if (G,P) is amenable.

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