K-theory for the tame C*-algebra of a separated graph

TL;DR

This paper computes the K-theory of tame graph C*-algebras associated with separated graphs, extending known results for graph C*-algebras and providing explicit descriptions of related algebraic maps.

Contribution

It determines the K-theory of the tame graph C*-algebra (E,C), showing how it relates to the known K-theory of the graph C*-algebra and describing the structure of the associated K-groups.

Findings

K_1(()) is an isomorphism

K_0(()) has a split monomorphism with torsion-free cokernel

Cokernel of K_0(())) is free abelian when E is finite

Abstract

A {\it separated graph} is a pair $(E,C)$ consisting of a directed graph $E$ and a set $C=\bigsqcup_{v\in E^0}C_v$, where each $C_v$ is a partition of the set of edges whose terminal vertex is $v$. Given a separated graph $(E,C)$, such that all the sets $X\in C$ are finite, the K-theory of the graph C*-algebra $C^*(E,C)$ is known to be determined by the kernel and the cokernel of a certain map, denoted by $1_C- A_{(E,C)}$, from $\mathbb Z^{(C)}$ to $\mathbb Z^{(E^0)}$. In this paper, we compute the K-theory of the {\it tame} graph C*-algebra $\mathcal O(E,C)$ associated to $(E,C)$, which has been recently introduced by the authors. Letting $\pi$ denote the natural surjective homomorphism from $C^*(E,C)$ onto $\mathcal O(E,C)$, we show that $K_1(\pi)$ is a group isomorphism, and that $K_0(\pi)$ is a split monomorphism, whose cokernel is a torsion-free abelian group. We also prove that this cokernel is a free abelian group when the graph $E$ is finite, and determine its generators in terms of a sequence of separated graphs $\{(E_n, C^n)\}_{n=1}^{\infty}$ naturally attached to $(E,C)$. On the way to showing our main results, we obtain an explicit description of a connecting map arising in a six-term exact sequence computing the K-theory of an amalgamated free product, and we also exhibit an explicit isomorphism between $\mathrm{ker} (1_C - A_{(E,C)})$ and $K_1(C^*(E,C))$.