The Talented Monoid of Higher-Rank Graphs with Applications to Kumjian-Pask Algebras

Abstract

Given a row-finite higher-rank k-graph , we define a commutative monoid T which is a higher-rank analogue of the talented monoid of a directed graph. The talented monoid T is canonically a Zk-monoid with respect to the action of state shift. This monoid coincides with the positive cone of the graded Grothendieck group K0gr(KPk()) of the Kumjian-Pask algebra KPk() with coefficients in a field k. The aim of the paper is to investigate this Zk-monoid as a capable invariant for classification of Kumjian-Pask algebras. If Zk acts freely on T (i.e., if T has no nonzero periodic element), then we show that the k-graph is aperiodic. The converse is also proved to be true provided has no sources and T is atomic. Moreover in this case, we provide a talented monoid characterization for strongly aperiodic k-graphs. We prove that for a row-finite k-graph without sources, cofinality is equivalent to the simplicity of T as a Zk-monoid. In view of this we provide a talented monoid criterion for the Kumjian-Pask algebra KPR() of over a unital commutative ring R to be graded basic ideal simple. We also describe the minimal left ideals of KPk() in terms of the aperiodic atoms of T and thus obtain a monoid theoretic characterization for Soc(KPk()) to be an essential ideal. These results help us to characterize semisimple Kumjian-Pask algebras through the lens of T.

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