Abstract. A subsemigroup S of an inverse semigroup Q is a left I-order in Q if every element in Q can be written as a−1b where a, b ∈ S and a−1 is the inverse of a in the sense of inverse semigroup theory. If we insist on a and b being R-related in Q, then we say that S is a straight left I-order in Q. We give necessary and sufficient conditions for a semigroup to be a left I-order in a bisimple inverse ω-semigroup. 1
The theory of inverse semigroups forms a major part of semigroup theory. This theory has deep connec...
AbstractA semigroup S (with zero) is called a right inverse semigroup if every (nonnull) principal l...
This thesis originated in an effort to find an efficient algorithm for the construction of finite in...
Abstract. A subsemigroup S of an inverse semigroup Q is a left I-order in Q if every element in Q ca...
Let $Q$ be an inverse semigroup. A subsemigroup $S$ of $Q$ is a left I-order in $Q$ and $Q$ is a sem...
Let Q be an inverse semigroup. A subsemigroup S of Q is a left I-order in Q, and Q is a semigroup of...
AbstractA subsemigroup S of a semigroup Q is a local left order in Q if, for every group H-class H o...
Abstract. In any semigroup S, we say that elements a and b are left inverses of each other if a = ab...
This paper deals with Simple and bi-simple inverse semi-groups. The general properties and character...
It was of great interest to study the relationships between the structure of a group and the structu...
We build on the description of left congruences on an inverse semigroup in terms of the kernel and t...
AbstractThe theory in this paper was motivated by an example of an inverse semigroup important in Gi...
We prove that the (b, c)-inverse and the inverse along an element in a semigroup are actually genuin...
Abstract In this paper, we introduce a new notion in a semigroup S as an extension of Mary's in...
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...
AbstractA semigroup S (with zero) is called a right inverse semigroup if every (nonnull) principal l...
This thesis originated in an effort to find an efficient algorithm for the construction of finite in...
Abstract. A subsemigroup S of an inverse semigroup Q is a left I-order in Q if every element in Q ca...
Let $Q$ be an inverse semigroup. A subsemigroup $S$ of $Q$ is a left I-order in $Q$ and $Q$ is a sem...
Let Q be an inverse semigroup. A subsemigroup S of Q is a left I-order in Q, and Q is a semigroup of...
AbstractA subsemigroup S of a semigroup Q is a local left order in Q if, for every group H-class H o...
Abstract. In any semigroup S, we say that elements a and b are left inverses of each other if a = ab...
This paper deals with Simple and bi-simple inverse semi-groups. The general properties and character...
It was of great interest to study the relationships between the structure of a group and the structu...
We build on the description of left congruences on an inverse semigroup in terms of the kernel and t...
AbstractThe theory in this paper was motivated by an example of an inverse semigroup important in Gi...
We prove that the (b, c)-inverse and the inverse along an element in a semigroup are actually genuin...
Abstract In this paper, we introduce a new notion in a semigroup S as an extension of Mary's in...
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...
AbstractA semigroup S (with zero) is called a right inverse semigroup if every (nonnull) principal l...
This thesis originated in an effort to find an efficient algorithm for the construction of finite in...