Adequate Semigroups

Fountain, John

doi:10.1017/s0013091500016230

Cited by 205 publications

(177 citation statements)

References 10 publications

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“…In fact each local submonoid of S is a semilattice, so S is an adequate locally inverse semigroup. If S were type A then for each idempotent e in S and each element a in S we would have eS 1 n aS 1 = eaS 1 -see Proposition 1.5 of [14]. Now, fa = b and fS 1 = {fz,b} and aS l = {a,z) and so fS l r>aS l = {z).…”

Section: Locally Type a Semigroupsmentioning

confidence: 98%

The natural partial order on an abundant semigroup

Lawson

1987

Proceedings of the Edinburgh Mathematical Society

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In this paper we will study the properties of a natural partial order which may be defined on an arbitrary abundant semigroup: in the case of regular semigroups we recapture the order introduced by Nambooripad [24]. For abelian PP rings our order coincides with a relation introduced by Sussman [25], Abian [1,2] and further studied by Chacron [7]. Burmistrovic [6] investigated Sussman's order on separative semigroups. In the abundant case his order coincides with ours: some order theoretic properties of such semigroups may be found in a paper by Burgess [5].Many properties and constructions on abundant semigroups may be described in terms of its natural partial order: one of the main results of Section 2 is the connection we establish between idempotent connectedness and the partial order being, in some sense, self-dual. In Section 3 we extend Nambooripad's Theorem 3.3 [24] and show that the order is compatible with the multiplication on a concordant semigroup just when the semigroup is locally type A. In Section 4 we obtain a description of the finest 0-restricted primitive good congruence on a concordant semigroup. Section 1 is a preliminary section in which we consider, in particular, the behaviour of good homomorphisms between abundant semigroups and obtain a generalisation of Lallement's Lemma. PreliminariesWe will assume some familiarity with the contents of [11] and [15]: the only divergence from the terminology established there is that we prefer to call *-ideals good ideals, bringing them in line with the good homomorphisms.The class of idempotent connected (IC) abundant semigroups was introduced by El-Qallali and Fountain [11]. We begin this section with an alternative characterisation of these semigroups due to Fountain, which, for the purposes of this paper, may serve as an alternative definition.

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Section: Locally Type a Semigroupsmentioning

confidence: 98%

The natural partial order on an abundant semigroup

Lawson

1987

Proceedings of the Edinburgh Mathematical Society

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“…We also recall the definitions and basic properties of left, right and two-sided adequate semigroups, more details of which can be found in [5].…”

Section: Preliminariesmentioning

confidence: 99%

“…Adequate semigroups, which were introduced by Fountain [5] in the 1970s, are semigroups in which the cancellation properties of elements in general are encapsulated in the cancellation properties of idempotent elements. They form a common generalization of inverse semigroups and cancellative monoids, and their study is a key focus of the York School of semigroup theory.…”

Section: Introductionmentioning

confidence: 99%

Retracts of trees and free left adequate semigroups

Kambites

2011

Proceedings of the Edinburgh Mathematical Society

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Recent research of the author has studied edge-labelled directed trees under a natural multiplication operation. The class of all such trees (with a fixed labelling alphabet) has an algebraic interpretation, as a free object in the class of adequate semigroups. We consider here a natural subclass of these trees, defined by placing a restriction on edge orientations, and show that the resulting algebraic structure is a free object in the class of left adequate semigroups. Through this correspondence we establish some structural and algorithmic properties of free left adequate semigroups and monoids, and consequently of the category of all left adequate semigroups.

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“…Following (6) we say that a semigroup with or without an identity in which each i? *-class contains an idempotent and the idempotents commute is right adequate.…”

Section: Factorisable Right a D E Q U A T E Semigroups Fey Abdulsalammentioning

confidence: 99%

Factorisable right adequate semigroups

El-Qallali

1981

Proceedings of the Edinburgh Mathematical Society

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On a semigroup S the relation ℒ* is defined by the rule that (a, b) ∈ ℒ* if and only if the elements a, b of S are related by Green's relation ℒ in some oversemigroup of S. It is well known that for a monoid S, every principal right ideal is projective if and only if each ℒ*-class of S contains an idempotent. Following (6) we say that a semigroup with or without an identity in which each ℒ*-class contains an idempotent and the idempotents commute is right adequate. A right adequate semigroup S in which eS ∩ aS = eaS for any e2 = e, a ∈ S is called right type A. This class of semigroups is studied in (5).

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Adequate Semigroups

Cited by 205 publications

References 10 publications

The natural partial order on an abundant semigroup

The natural partial order on an abundant semigroup

Retracts of trees and free left adequate semigroups

Factorisable right adequate semigroups

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