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Related papers: Almost perfect restriction semigroups

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We study classes of proper restriction semigroups determined by properties of partial actions underlying them. These properties include strongness, antistrongness, being defined by a homomorphism, being an action etc. Of particular interest…

Rings and Algebras · Mathematics 2015-03-12 Ganna Kudryavtseva

Let $T(X)$ (resp. L(V)) be the semigroup of all transformations (resp. linear transformations) of a set $X$ (resp. vector space $V$). For a subset $Y$ of $X$ and a subsemigroup $\mathbb{S}(Y)$ of $T(Y)$, consider the subsemigroup…

Group Theory · Mathematics 2023-03-08 Mosarof Sarkar , Shubh N. Singh

Each restriction semigroup is proved to be embeddable in a factorisable restriction monoid, or, equivalently, in an almost factorisable restriction semigroup. It is also established that each restriction semigroup has a proper cover which…

Rings and Algebras · Mathematics 2018-09-19 Victoria Gould , Miklos Hartmann , Maria Szendrei

A semigroup $S$ is said to be right pseudo-finite if the universal right congruence can be generated by a finite set $U\subseteq S\times S$, and there is a bound on the length of derivations for an arbitrary pair $(s,t)\in S\times S$ as a…

Group Theory · Mathematics 2022-11-14 Victoria Gould , Craig Miller , Thomas Quinn-Gregson , Nik Ruskuc

A DR-semigroup $S$ (also known as a reduced E-semiabundant or reduced E-Fountain semigroup) is here viewed as a semigroup equipped with two unary operations $D,R$ satisfying finitely many equational laws. Examples include DRC-semigroups…

Rings and Algebras · Mathematics 2026-01-08 Tim Stokes

We introduce the notion of semigroup with a tight ideal series and investigate their closures in semitopological semigroups, particularly inverse semigroups with continuous inversion. As a corollary we show that the symmetric inverse…

Group Theory · Mathematics 2009-03-19 Oleg Gutik , Jimmie Lawson , Dušan Repovš

We formulate an alternative approach to describing Ehresmann semigroups by means of left and right \'etale actions of a meet semilattice on a category. We also characterize the Ehresmann semigroups that arise as the set of all subsets of a…

Category Theory · Mathematics 2021-04-21 Mark V Lawson

Given a monoid $S$ with $E$ any non-empty subset of its idempotents, we present a novel one-sided version of idempotent completion we call left $E$-completion. In general, the construction yields a one-sided variant of a small category…

Group Theory · Mathematics 2023-08-25 Tim Stokes

We propose a notion of a proper Ehresmann semigroup based on a three-coordinate description of its generating elements governed by certain labelled directed graphs with additional structure. The generating elements are determined by their…

Rings and Algebras · Mathematics 2024-10-29 Ganna Kudryavtseva , Valdis Laan

A partial automorphism of a semigroup $S$ is any isomorphism between its subsemigroups, and the set all partial automorphisms of $S$ with respect to composition is the inverse monoid called the partial automorphism monoid of $S$. Two…

Rings and Algebras · Mathematics 2011-07-26 Simon M. Goberstein

In this paper we introduce the notion of right waist and right comparizer ideals for semigroups. In particular, we study the ideal theory of semigroups containing right waists and right comparizer ideals. We also study those properties of…

Rings and Algebras · Mathematics 2009-12-16 Nazer. H. Halimi

In this paper, among other results, there are described (complete) simple - simultaneously ideal- and congruence-simple - endomorphism semirings of (complete) idempotent commutative monoids; it is shown that the concepts of simpleness,…

Rings and Algebras · Mathematics 2011-05-30 Yefim Katsov , Tran Giang Nam , Jens Zumbrägel

This paper concerns a class of semigroups that arise as products $US$, associated to what we call `action pairs'. Here $U$ and $S$ are subsemigroups of a common monoid and, roughly speaking, $S$ has an action on the monoid completion $U^1$…

Rings and Algebras · Mathematics 2023-09-21 Scott Carson , Igor Dolinka , James East , Victoria Gould , Rida-e Zenab

We prove a structure result on proper extensions of two-sided restriction semigroups in terms of partial actions, generalizing respective results for monoids and for inverse semigroups and upgrading the latter. We introduce and study…

Rings and Algebras · Mathematics 2024-10-29 Mikhailo Dokuchaev , Mykola Khrypchenko , Ganna Kudryavtseva

We study simple and projective modules of a certain class of Ehresmann semigroups, a well-studied generalization of inverse semigroups. Let $S$ be a finite right (left) restriction Ehresmann semigroup whose corresponding Ehresmann category…

Representation Theory · Mathematics 2021-03-09 Stuart Margolis , Itamar Stein

The partial automorphism monoid of an inverse semigroup is an inverse monoid consisting of all isomorphisms between its inverse subsemigroups. We prove that a tightly connected fundamental inverse semigroup $S$ with no isolated nontrivial…

Rings and Algebras · Mathematics 2011-07-26 Simon M. Goberstein

A semigroup is completely simple if it has no proper ideals and contains a primitive idempotent. We say that a completely simple semigroup $S$ is a homogeneous completely simple semigroup if any isomorphism between finitely generated…

Rings and Algebras · Mathematics 2019-10-23 Thomas Quinn-Gregson

We provide a new and much simpler structure for quasi-ideal adequate transversals of abundant semigroups in terms of spined products, which is similar in nature to that given by Saito for weakly multiplicative inverse transversals of…

Group Theory · Mathematics 2010-03-23 Jehan Al-Bar , James Renshaw

'A semigroup is completely regular if and only if it is a union of groups'- an analogue of this structure theorem of completely regular semigroup has been obtained in the setting of seminearrings in [[16], Mukherjee (Pal) et al., Semigroup…

Rings and Algebras · Mathematics 2025-07-10 Rajlaxmi Mukherjee , Tuhin Manna , Kamalika Chakraborty , Sujit Kumar Sardar

A congruence $\varepsilon$ on a semigroup $S$ is perfect if for any congruence classes $x\varepsilon$ and $y\varepsilon$ their product as subsets of $S$ coincides (as a set) with the congruence class $(xy)\varepsilon$. Perfect congruences…

Rings and Algebras · Mathematics 2021-07-28 Simon M. Goberstein , Katherine Grimshaw , Anthony Kling , Therese Landry , Freda Li
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