Irreducible representations of the crystallization of the quantized function algebras C(SUq(n+1))

Abstract

Crystallization of the C*-algebras C(SUq(n+1)) was introduced by Giri \& Pal as a C*-algebra C(SU0(n+1)) given by a finite set of generators and relations. Here we study representations of the C*-algebra C(SU0(n+1)) and prove a factorization theorem for its irreducible representations. This leads to a complete classification of all irreducible representations of this C*-algebra. As an important consequence, we prove that all the irreducible representations of C(SU0(n+1)) arise exactly as q 0+ limits of irreducible representations of C(SUq(n+1)). We also present a few other important corollaries of the classification theorem.