Ehresmann Semigroups Whose Categories are EI and Their Representation Theory : Extended Version
Abstract
We study simple and projective modules of a certain class of Ehresmann semigroups, a well-studied generalization of inverse semigroups. Let be a finite right (left) restriction Ehresmann semigroup whose corresponding Ehresmann category is an EI-category, that is, every endomorphism is an isomorphism. We show that the collection of finite right restriction Ehresmann semigroups whose categories are EI is a pseudovariety. We prove that the simple modules of the semigroup algebra (over any field ) are formed by inducing the simple modules of the maximal subgroups of via the corresponding Sch\"{u}tzenberger module. Moreover, we show that over fields with good characteristic the indecomposable projective modules can be described in a similar way but using generalized Green's relations instead of the standard ones. As a natural example, we consider the monoid of all partial functions on an -element set. Over the field of complex numbers, we give a natural description of its indecomposable projective modules and obtain a formula for their dimension. Moreover, we find certain zero entries in its Cartan matrix.
Cite
@article{arxiv.2008.06852,
title = {Ehresmann Semigroups Whose Categories are EI and Their Representation Theory : Extended Version},
author = {Stuart Margolis and Itamar Stein},
journal= {arXiv preprint arXiv:2008.06852},
year = {2021}
}