English

Presentations for singular wreath products

Group Theory 2018-05-15 v2 Rings and Algebras

Abstract

For a monoid MM and a subsemigroup SS of the full transformation semigroup TnT_n, the wreath product MSM\wr S is defined to be the semidirect product MnSM^n\rtimes S, with the coordinatewise action of SS on MnM^n. The full wreath product MTnM\wr T_n is isomorphic to the endomorphism monoid of the free MM-act on nn generators. Here, we are particularly interested in the case that S=SingnS=Sing_n is the singular part of TnT_n, consisting of all non-invertible transformations. Our main results are presentations for MSingnM\wr Sing_n 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 MSingnM\wr Sing_n is idempotent generated if and only if the set M/LM/L of LL-classes of MM forms a chain under the usual ordering of LL-classes, and we give a presentation for MSingnM\wr Sing_n in terms of idempotent generators for such a monoid MM. Among other results, we also give estimates for the minimal size of a generating set for MSingnM\wr Sing_n, as well as exact values in some cases (including the case that MM is finite and M/LM/L 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

R2 v1 2026-06-22T15:44:01.083Z