A generalization of higher rank graphs

Abstract

We introduce what we call `generalized higher rank k-graphs' as a class of categories equipped with a notion of size. They extend not only the higher rank k-graphs, but also the Levi categories introduced by the first author as a categorical setting for graphs of groups. We prove that examples of generalized higher rank k-graphs can be constructed using Zappa-Sz\'ep products of groupoids and higher rank graphs.