CCR and CAR algebras are connected via a path of Cuntz-Toeplitz algebras

Abstract

For q ∈ R, |q| < 1 we consider the universal enveloping C*-algebra of a *-algebra of q-canonical commutation relations (q-CCR), which is generated by a1, …, an subject to the relations \[ ai* aj = δij 1 + q aj ai* . \] It has a distinguished representation πF called the Fock representation, which is believed to be faithful. In this article we denote the image of the universal enveloping C*-algebra of q-CCR in the Fock representation by q. The question whether C*-isomorphism q 0 holds has been considered in the literature and proved for |q| < 0.44. In this article we show that q 0 for |q| < 1.