Approximate representability of finite abelian group actions on the Razak-Jacelon algebra

Abstract

Let A be a simple separable nuclear monotracial C*-algebra, and let α be an outer action of a finite abelian group on A. In this paper, we show that α idW on A is approximately representable if and only if the characteristic invariant of α is trivial, where W is the Razak-Jacelon algebra and α is the induced action on the injective II1 factor πτA(A)''. As an application of this result, we classify such actions up to conjugacy and cocycle conjugacy. In particular, we show the following: Let A and B be simple separable nuclear monotracial C*-algebras, and let α and β be outer actions of a finite abelian group on A and B, respectively. Assume that the characteristic invariants of α and β are trivial. Then α idW and β idW are conjugate (resp. cocycle conjugate) if and only if α on πτA(A)'' and β on πτB(B)'' are conjugate (resp. cocycle conjugate). We also construct the model actions.