On the permanence properties of residually exact groups

Abstract

A discrete group is called exact if the reduced group C*-algebra Cλ*() is exact as C*-algebras, and a discrete group is called residually exact if every nonunital element g ∈ admits a surjective group homomorphism from to some exact group which maps g to a nonunital element of . We prove the class of residually exact groups is closed under taking Green's graph products [1], double amalgamed products and special HNN extensions.

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