The K-Theory of Toeplitz C*-Algebras of Right-Angled Artin Groups

Abstract

To a graph one can associate a C*-algebra C*() generated by isometries. Such C*-algebras were studied recently by Crisp and Laca. They are a special case of the Toeplitz C*-algebras T(G, P) associated to quasi-latice ordered groups (G, P) introduced by Nica. Crisp and Laca proved that the so called "boundary quotients" C*q() of C*() are simple and purely infinite. For a certain class of finite graphs we show that C*q() can be represented as a full corner of a crossed product of an appropriate C*-subalgebra of C*q() built by using C*('), where ' is a subgraph of with one less vertex, by the group Z. Using induction on the number of the vertices of we show that C*q() are nuclear and belong to the small bootstrap class. This also enables us to use the Pimsner-Voiculescu exact sequence to find their K-theory. Finally we use the Kirchberg-Phillips classification theorem to show that those C*-algebras are isomorphic to tensor products of On for 1 ≤ n ≤ ∞.