C*-algebras from k group representations

Abstract

We introduce certain C*-algebras and k-graphs associated to k finite dimensional unitary representations 1,...,k of a compact group G. We define a higher rank Doplicher-Roberts algebra O_1,...,k, constructed from intertwiners of tensor powers of these representations. Under certain conditions, we show that this C*-algebra is isomorphic to a corner in the C*-algebra of a row finite rank k graph with no sources. For G finite and i faithful of dimension at least 2, this graph is irreducible, it has vertices G and the edges are determined by k commuting matrices obtained from the character table of the group. We illustrate with some examples when O_1,...,k is simple and purely infinite, and with some K-theory computations.