Classification of irrational -deformed CAR C*-algebras

Abstract

Given a skew-symmetric real n× n matrix we consider the universal enveloping C*-algebra CAR of the *-algebra generated by a1, …, an subject to the relations \[ ai* ai + ai ai* = 1, \ \] \[ ai* aj = e2 π i i,j aj ai*, \] \[ ai aj = e-2 π i i,j aj ai. \] We prove that CAR has a C(Kn)-structure, where Kn = [ 0,12 ]n is the hypercube and describe the fibers. We classify irreducible representations of CAR in terms of irreducible representations of a higher-dimensional noncommutative torus. We prove that for a given irrational skew-symmetric 1 there are only finitely many 2 such that CAR_1 CAR_2. Namely, CAR_1 CAR_2 implies (1)ij = (2)σ(i,j) Z for a bijection σ of the set \(i,j) : i < j, \ i, j = 1, …, n\. For n = 2 we give a full classification: CARθ1 CARθ2 iff θ1 = θ2 Z.