Add to ORKGIn this paper we introduce a new flatness property of acts over monoids which is an extension of Conditions (P) and (E), called Condi-tion (EP) and will give a classification of monoids over which all (finitely generated, cyclic, monocyclic) right acts satisfying Condition (EP) have other flatness properties and also monoids over which all (cyclic) right acts satisfy Condition (EP). Mathematics Subject Classification: 20M3
In [1] Bican, Bashir and Enochs finally solved a long standing conjec-ture in module theory that all...
AbstractLet S be a monoid. It is shown that all flat left S-acts are regular if and only if every cy...
Let S be a monoid. A right S-act A is pullback flat ( = strongly flat) if the functor A ⊗ – (from t...
This note presents a classification of commutative, cancellative monoids S by flatness properties of...
A lot has been written lately about various flatness concepts of acts over monoids and in particular...
... initiated of flatness properties of right acts AS over a monoid S that can be described in terms...
Valdis Laan in (On a generalization of strong flatness, Acta Comment. Univ. Tartuensis 2 (1998), 55-...
Our aim in this paper is to study the concept of stability for acts over monoids and in the process ...
Our aim in this paper is to study the concept of stability for acts over monoids and in the process ...
This note presents a classification of commutative, cancellative monoids S by flatness properties of...
This note presents a classification of commutative, cancellative monoids S by flatness properties of...
It is well-known that, using principal weak flatness property, some important monoids are characteri...
The investigation of injective and projective acts over a monoid S was begun by P. Berthiaume and L....
Using the generalizations of strong flatness properties and of condition (P), some new characterizat...
Laan in (Ph.D Thesis, Tartu. 1999) introduced the principal weak form of Condition $(P)$ as Conditio...
In [1] Bican, Bashir and Enochs finally solved a long standing conjec-ture in module theory that all...
AbstractLet S be a monoid. It is shown that all flat left S-acts are regular if and only if every cy...
Let S be a monoid. A right S-act A is pullback flat ( = strongly flat) if the functor A ⊗ – (from t...
This note presents a classification of commutative, cancellative monoids S by flatness properties of...
A lot has been written lately about various flatness concepts of acts over monoids and in particular...
... initiated of flatness properties of right acts AS over a monoid S that can be described in terms...
Valdis Laan in (On a generalization of strong flatness, Acta Comment. Univ. Tartuensis 2 (1998), 55-...
Our aim in this paper is to study the concept of stability for acts over monoids and in the process ...
Our aim in this paper is to study the concept of stability for acts over monoids and in the process ...
This note presents a classification of commutative, cancellative monoids S by flatness properties of...
This note presents a classification of commutative, cancellative monoids S by flatness properties of...
It is well-known that, using principal weak flatness property, some important monoids are characteri...
The investigation of injective and projective acts over a monoid S was begun by P. Berthiaume and L....
Using the generalizations of strong flatness properties and of condition (P), some new characterizat...
Laan in (Ph.D Thesis, Tartu. 1999) introduced the principal weak form of Condition $(P)$ as Conditio...
In [1] Bican, Bashir and Enochs finally solved a long standing conjec-ture in module theory that all...
AbstractLet S be a monoid. It is shown that all flat left S-acts are regular if and only if every cy...
Let S be a monoid. A right S-act A is pullback flat ( = strongly flat) if the functor A ⊗ – (from t...