AbstractAs a generalization of quasi-inverse semigroups in the class of regular semigroups, we consider the Q⁎-inverse semigroups which are idempotent-connected abundant semigroups with regular bands. In this paper, a construction theorem of Q⁎-inverse semigroups is given by using the wreath product of some semigroups. It is proved that a semigroup S is a Q⁎-inverse semigroup if and only if S is a spined product of an L⁎-inverse semigroup and an R⁎-inverse semigroup. Thus the structure of Q⁎-inverse semigroups is fully described and the results on quasi-inverse semigroups obtained by M. Yamada in 1973 are extended and amplified
The theory of inverse semigroups forms a major part of semigroup theory. This theory has deep connec...
In this paper, we develop the elementary theory of inverse semigroups to the cases of type B semigro...
This thesis describes semigroups and the properties of both regular and inverse semigroups
AbstractAs a generalization of quasi-inverse semigroups in the class of regular semigroups, we consi...
We provide a new and much simpler structure for quasi-ideal adequate transversals of abundant semigr...
In this paper, a structure theorem is obtained by a permissible dou-ble (R,Λ) which is about regular...
In this paper, we introduce a new inverse transversal E-inverse transver-sal. We discuss some nature...
Let X be a subset of a semigroup S. We denote by E(X) the set of idempotent elements Of X.An element...
Abstract. The aim of this paper is to study semigroups possessing E-regular elements, where an eleme...
AbstractLet Wr(U, V) denote the variety of inverse semigroups generated by wreath products of semigr...
An inverse transversal of a regular semigroup S is an inverse subsemigroup S degrees that contains p...
Inverses semigroups and orthodox semigroups are either defined in terms of inverses, or in terms of ...
It is well-known that the notion of the semidirect product of groups can be looked at from three dif...
AbstractIn this paper we describe idempotent pure regular extensions by inverse semigroups by means ...
The theory of inverse semigroups forms a major part of semigroup theory. This theory has deep connec...
The theory of inverse semigroups forms a major part of semigroup theory. This theory has deep connec...
In this paper, we develop the elementary theory of inverse semigroups to the cases of type B semigro...
This thesis describes semigroups and the properties of both regular and inverse semigroups
AbstractAs a generalization of quasi-inverse semigroups in the class of regular semigroups, we consi...
We provide a new and much simpler structure for quasi-ideal adequate transversals of abundant semigr...
In this paper, a structure theorem is obtained by a permissible dou-ble (R,Λ) which is about regular...
In this paper, we introduce a new inverse transversal E-inverse transver-sal. We discuss some nature...
Let X be a subset of a semigroup S. We denote by E(X) the set of idempotent elements Of X.An element...
Abstract. The aim of this paper is to study semigroups possessing E-regular elements, where an eleme...
AbstractLet Wr(U, V) denote the variety of inverse semigroups generated by wreath products of semigr...
An inverse transversal of a regular semigroup S is an inverse subsemigroup S degrees that contains p...
Inverses semigroups and orthodox semigroups are either defined in terms of inverses, or in terms of ...
It is well-known that the notion of the semidirect product of groups can be looked at from three dif...
AbstractIn this paper we describe idempotent pure regular extensions by inverse semigroups by means ...
The theory of inverse semigroups forms a major part of semigroup theory. This theory has deep connec...
The theory of inverse semigroups forms a major part of semigroup theory. This theory has deep connec...
In this paper, we develop the elementary theory of inverse semigroups to the cases of type B semigro...
This thesis describes semigroups and the properties of both regular and inverse semigroups