An introduction to separated graphs and their type semigroups
Abstract
We introduce -algebras associated with directed graphs, along with two generalizations of this concept, namely Exel-Pardo -algebras associated with a self-similar action of a group on a directed graph, and the -algebras associated with separated graphs. These constructions have in common that they have a dynamical behavior, being the groupoid -algebras associated to certain topological groupoids, which are built from the combinatorial structure. An important invariant one may associate to these dynamical systems is the so-called type semigroup. We will find a formula to compute the type semigroup for a general self-similar action of a group on a row-finite graph without sources, following a recent paper by Kwa\'sniewski, Meyer and Prasad, and for any finite bipartite separated graph, following a paper by Exel and the author. In addition, we will review various results concerning the structure of the type semigroup for different dynamical systems.
Keywords
Cite
@article{arxiv.2604.18304,
title = {An introduction to separated graphs and their type semigroups},
author = {Pere Ara},
journal= {arXiv preprint arXiv:2604.18304},
year = {2026}
}
Comments
47 pages