On C*-algebras generated by pairs of q-commuting isometries

Abstract

We consider the C*-algebras O2q and A2q generated, respectively, by isometries s1, s2 satisfying the relation s1* s2 = q s2 s1* with |q| < 1 (the deformed Cuntz relation), and by isometries s1, s2 satisfying the relation s2 s1 = q s1 s2 with |q| = 1. We show that O2q is isomorphic to the Cuntz-Toeplitz C*-algebra O20 for any |q| < 1. We further prove that A2q1 is isomorphic to A2q2 if and only if either q1 = q2 or q1 = complex conjugate of q2. In the second part of our paper, we discuss the complexity of the representation theory of A2q. We show that A2q is *-wild for any q in the circle |q| = 1, and hence that A2q is not nuclear for any q in the circle.

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