English

A groupoid approach to regular $*$-semigroups

Rings and Algebras 2023-11-28 v2 Category Theory Group Theory

Abstract

In this paper we develop a new groupoid-based structure theory for the class of regular *-semigroups. This class occupies something of a `sweet spot' between the important classes of inverse and regular semigroups, and contains many natural examples. Some of the most significant families include the partition, Brauer and Temperley-Lieb monoids, among other diagram monoids. Our main result is that the category of regular *-semigroups is isomorphic to the category of so-called `chained projection groupoids'. Such a groupoid is in fact a triple (P,G,ε)(P,\mathcal G,\varepsilon), where: \bullet PP is a projection algebra (in the sense of Imaoka and Jones), \bullet G\mathcal G is an ordered groupoid with object set PP, and \bullet ε:CG\varepsilon:\mathscr C\to\mathcal G is a special functor, where C\mathscr C is a certain natural `chain groupoid' constructed from PP. Roughly speaking: the groupoid G=G(S)\mathcal G=\mathcal G(S) remembers only the `easy' products in a regular *-semigroup SS; the projection algebra P=P(S)P=P(S) remembers only the `conjugation action' of the projections of SS; and the functor ε=ε(S)\varepsilon=\varepsilon(S) tells us how G\mathcal G and PP `fit together' in order to recover the entire structure of SS. In this way, we obtain the first completely general structure theorem for regular *-semigroups. As a consequence of our main result, we give a new proof of the celebrated Ehresmann--Schein--Nambooripad Theorem, which establishes an isomorphism between the categories of inverse semigroups and inductive groupoids. Other applications will be given in future works. We consider several examples along the way, and pose a number of problems that we believe are worthy of further attention.

Keywords

Cite

@article{arxiv.2301.04845,
  title  = {A groupoid approach to regular $*$-semigroups},
  author = {James East and P. A. Azeef Muhammed},
  journal= {arXiv preprint arXiv:2301.04845},
  year   = {2023}
}

Comments

V2 (80 pages, 17 figures) is majorly revised, incorporating referee's suggestions - to appear in Adv Math. Sections on free and fundamental regular *-semigroups have been removed, and will be the subject of future papers. V1 (102 pages; 16 figures)

R2 v1 2026-06-28T08:09:57.876Z