Higher-rank graphs and the graded K-theory of Kumjian-Pask algebras

Abstract

This paper lays out the foundations of graded K-theory for Leavitt algebras associated with higher-rank graphs, also known as Kumjian-Pask algebras, establishing it as a potential tool for their classification. For a row-finite k-graph Λ without sources, we show that there exists a Z[Zk]-module isomorphism between the graded zeroth (integral) homology H0gr(GΛ) of the infinite path groupoid GΛ and the graded Grothendieck group K0gr(KPk(Λ)) of the Kumjian-Pask algebra KPk(Λ), which respects the positive cones (i.e., the talented monoids). We demonstrate that the k-graph moves of in-splitting and sink deletion defined by Eckhardt et al. (Canad. J. Math. 2022) preserve the graded K-theory of associated Kumjian-Pask algebras and produce algebras which are graded Morita equivalent, thus providing evidence that graded K-theory may be an effective invariant for classifying certain Kumjian-Pask algebras. We also determine a natural sufficient condition regarding the fullness of the graded Grothendieck group functor. More precisely, for two row-finite k-graphs Λ and Ω without sources and with finite object sets, we obtain a sufficient criterion for lifting a pointed order-preserving Z[Zk]-module homomorphism between K0gr(KPk(Λ)) and K0gr(KPk(Ω)) to a unital graded ring homomorphism between KPk(Λ) and KPk(Ω). For this we adopt, in the setting of k-graphs, the bridging bimodule technique recently introduced by Abrams, Ruiz and Tomforde (Algebr. Represent. Theory 2024).