A semigroup S is right noetherian if every right congruence on S is finitely generated. In this paper we present some fundamental properties of right noetherian semigroups, discuss how semigroups relate to their substructures with regard to the property of being right noetherian, and investigate whether this property is preserved under various semigroup construction
As with groups, one can study the left regular representation of a semigroup. If one considers such...
The purpose of the presented paper is to study the structure of semigroups of following types: 1. se...
In the following text, the main aim is to distinguish some relations between Smarad- che semigroups ...
We call a semigroup S f-noetherian if every right congruence of finite index on S is finitely genera...
AbstractIt is shown that a semigroup S is finitely generated whenever the semigroup algebra K[S] is ...
We provide a short and more direct proof that a commutative semigroup is finitely generated if its l...
A monoid S is right coherent if every finitely generated subact of every finitely presented right S-...
We introduce a new notion of rank for a semigroup S. The rank is associated with pairs (I,ρ), where ...
Copyright © 2014 Kozhukhov and Kozhukhova. This is an open access article distributed under the Crea...
AbstractA semigroup S (with zero) is called a right inverse semigroup if every (nonnull) principal l...
Strict RA semigroups are common generalizations of ample semigroups and inverse semigroups. The aim ...
It is well-known that a semigroup is a group if it has a right-identity and right-inverses. A questi...
A right adequate semigroup of type F means a right adequate semi-group which is an F-rpp semigroup. ...
A semigroup S is said to be right pseudo-finite if the universal right congruence can be generated b...
Abstract: By a right [left] nearring we mean a triple (N,+, ·) where (N,+) is an ablien group, (N, ·...
As with groups, one can study the left regular representation of a semigroup. If one considers such...
The purpose of the presented paper is to study the structure of semigroups of following types: 1. se...
In the following text, the main aim is to distinguish some relations between Smarad- che semigroups ...
We call a semigroup S f-noetherian if every right congruence of finite index on S is finitely genera...
AbstractIt is shown that a semigroup S is finitely generated whenever the semigroup algebra K[S] is ...
We provide a short and more direct proof that a commutative semigroup is finitely generated if its l...
A monoid S is right coherent if every finitely generated subact of every finitely presented right S-...
We introduce a new notion of rank for a semigroup S. The rank is associated with pairs (I,ρ), where ...
Copyright © 2014 Kozhukhov and Kozhukhova. This is an open access article distributed under the Crea...
AbstractA semigroup S (with zero) is called a right inverse semigroup if every (nonnull) principal l...
Strict RA semigroups are common generalizations of ample semigroups and inverse semigroups. The aim ...
It is well-known that a semigroup is a group if it has a right-identity and right-inverses. A questi...
A right adequate semigroup of type F means a right adequate semi-group which is an F-rpp semigroup. ...
A semigroup S is said to be right pseudo-finite if the universal right congruence can be generated b...
Abstract: By a right [left] nearring we mean a triple (N,+, ·) where (N,+) is an ablien group, (N, ·...
As with groups, one can study the left regular representation of a semigroup. If one considers such...
The purpose of the presented paper is to study the structure of semigroups of following types: 1. se...
In the following text, the main aim is to distinguish some relations between Smarad- che semigroups ...
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