Polynomial identities and Azumaya loci for rational quantum spheres

Abstract

We prove a number of structure and isomorphism results concerning the non-commutative Natsume-Olsen spheres S2n-1θ deformed along a skew-symmetric matrix θ∈ R. These include (a) the fact that two C*-algebras of the form S3θ Mn are isomorphic precisely in the obvious cases; (b) the fact that m and n are recoverable from the isomorphism class of C(S2m-1θ) Mn; (c) the PI character, PI degree and Azumaya loci of C(S2m-1θ) for rational θ, along with a realization of their centers as (function algebras of) branched cover of S2n-1 and (d) for rational θ again, the topological finite generation of C(S2m-1θ) over their centers, with algebraic finite generation equivalent to being classical (equivalently, Azumaya).