Presentations for singular wreath products
Abstract
For a monoid and a subsemigroup of the full transformation semigroup , the wreath product is defined to be the semidirect product , with the coordinatewise action of on . The full wreath product is isomorphic to the endomorphism monoid of the free -act on generators. Here, we are particularly interested in the case that is the singular part of , consisting of all non-invertible transformations. Our main results are presentations for in terms of certain natural generating sets, and we prove these via general results on semidirect products and wreath products. We re-prove a classical result of Bulman-Fleming that is idempotent generated if and only if the set of -classes of forms a chain under the usual ordering of -classes, and we give a presentation for in terms of idempotent generators for such a monoid . Among other results, we also give estimates for the minimal size of a generating set for , as well as exact values in some cases (including the case that is finite and is a chain, in which case we also calculate the minimal size of an idempotent generating set). As an application of our results, we obtain a presentation (with idempotent generators) for the idempotent generated subsemigroup of the endomorphism monoid of a uniform partition of a finite set.
Cite
@article{arxiv.1609.02441,
title = {Presentations for singular wreath products},
author = {Ying-Ying Feng and Asawer Al-Aadhami and Igor Dolinka and James East and Victoria Gould},
journal= {arXiv preprint arXiv:1609.02441},
year = {2018}
}
Comments
V2: 34 pages, 5 figures - reformatted and footnotes added concerning semigroups with a right identity. V1: 35 pages, 5 figures