Non-amenable simple C*-algebras with tracial approximation

Abstract

We construct two types of unital separable simple C*-alebras AzC1 and AzC2, one is exact but not amenable, and the other is non-exact. Both have the same Elliott invariant as the Jiang-Su algebra, namely, AzCi has a unique tracial state, (K0(AzCi), K0(AzCi)+, [1AzCi ])=( Z, Z+,1) and K1(AzCi)=\0\ (i=1,2). We show that AzCi (i=1,2) is essentially tracially in the class of separable Z-stable C*-alebras of nuclear dimension 1. AzCi has stable rank one, strict comparison for positive elements and no 2-quasitrace other than the unique tracial state. We also produce models of unital separable simple non-exact C*-alebras which are essentially tracially in the class of simple separable nuclear Z-stable C*-alebras and the models exhaust all possible weakly unperforated Elliott invariants. We also discuss some basic properties of essential tracial approximation.

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