On the K-theory of C*-algebras arising from integral dynamics

TL;DR

This paper studies the K-theory of certain C*-algebras from integral dynamics, revealing their structure and classifying them in specific cases, with implications for broader conjectures in the field.

Contribution

It provides a detailed analysis of the K-theory of unital UCT Kirchberg algebras from integral dynamics and proposes a conjecture linking subalgebras to tensor products of Cuntz algebras.

Findings

K-theory decomposes into free and torsion parts.

Complete classification for cases where |S| ≤ 2 or gcd is 1.

Supports conjecture that a subalgebra equals a tensor product of Cuntz algebras.

Abstract

We investigate the $K$-theory of unital UCT Kirchberg algebras $\mathcal{Q}_S$ arising from families $S$ of relatively prime numbers. It is shown that $K_*(\mathcal{Q}_S)$ is the direct sum of a free abelian group and a torsion group, each of which is realized by another distinct $C^*$-algebra naturally associated to $S$. The $C^*$-algebra representing the torsion part is identified with a natural subalgebra $\mathcal{A}_S$ of $\mathcal{Q}_S$. For the $K$-theory of $\mathcal{Q}_S$, the cardinality of $S$ determines the free part and is also relevant for the torsion part, for which the greatest common divisor $g_S$ of $\{p-1 : p \in S\}$ plays a central role as well. In the case where $\lvert S \rvert \leq 2$ or $g_S=1$ we obtain a complete classification for $\mathcal{Q}_S$. Our results support the conjecture that $\mathcal{A}_S$ coincides with $\otimes_{p \in S} \mathcal{O}_p$. This would lead to a complete classification of $\mathcal{Q}_S$, and is related to a conjecture about $k$-graphs.