Complete Characterization of K-Theory for C*-algebras Associated to Locally Finite Unoriented Graphs

Abstract

In this paper we give a complete description of K-theory groups for Cuntz-Krieger C*-algebras associated to general locally-finite (topologically connected) graphs via Bass-Hashimoto operator. Our result generalizes the one obtained by the second author for the case of graphs with not necessarily finite first Betti numbers. On the basis of purely graph-theoretical method introduced by G. Cornelissen, O. Lorscheid, M. Marcolli and developed further by N.Iyudu, we prove that for the algebra OE associated to an infinite graph E of the above form holds K0(OE)=Zβ(E) Zγ(E) and K1(OE) = Zγ(E), where β(E)= H1(E) and γ(E) stands for the cardinality of the valency set of E, defined in the paper.