Add to ORKGAbstract. This article studies commutative orders, that is, commutative semigroups having a semigroup of quotients. In a commutative order S, the square-cancellable elements S(S) constitute a well-behaved separable sub-semigroup. Indeed, S(S) is also an order and has a maximum semigroup of quotients R, which is Clifford. We present a new characterisation of com-mutative orders in terms of semilattice decompositions of S(S) and families of ideals of S. We investigate the role of tensor products in constructing quotients, and show that all semigroups of quotients of S are homomorphic images of the tensor product R ⊗S(S) S. By introducing the notions of generalised order and semigroup of generalised quotients, we show that if S has a semigroup...
We consider particular compatible orders on a given completely simple semigroup Sx=M((x);I,Λ;P) wher...
Investigations of the lattice of congruences on a semigroup have taken two different directions. One...
Inspired by the ring theory concepts of orders and classical rings of quotients, Fountain and Petric...
This article studies commutative orders, that is, commutative semigroups having a semigroup of quoti...
summary:The concept of rank of a commutative cancellative semigroup is extended to all commutative s...
Abstract. An ordered semigroup is a structure S = 〈S, ·,≤ 〉 with a binary operation · that is associ...
In this paper we characterize both the Clifford and left Clifford ordered semigroups by their bi-ide...
This paper arose as a tribute to A. H. CLIFFORD and significant portions of it were presented at a c...
In this thesis we are concerned with arithmetic in a certain partially ordered, commutative semigrou...
Research Doctorate - Doctor of Philosophy (PhD)(**Note: this abstract is a plain text version of the...
In 1991, Lawson introduced three partial orders on reduced Usemiabundant semigroups. Their definitio...
In this paper we characterize both the Clifford and left Clifford ordered semigroups by their bi-ide...
AbstractIn this paper we consider the Stone-Čech compactifications of discrete semigroups which are ...
Exactly as in semigroups, Green’s relations play an important role in the theory of ordered semigrou...
We use ordered categories to study semidirect decompositions of finite ordered semigroups. We obtain...
We consider particular compatible orders on a given completely simple semigroup Sx=M((x);I,Λ;P) wher...
Investigations of the lattice of congruences on a semigroup have taken two different directions. One...
Inspired by the ring theory concepts of orders and classical rings of quotients, Fountain and Petric...
This article studies commutative orders, that is, commutative semigroups having a semigroup of quoti...
summary:The concept of rank of a commutative cancellative semigroup is extended to all commutative s...
Abstract. An ordered semigroup is a structure S = 〈S, ·,≤ 〉 with a binary operation · that is associ...
In this paper we characterize both the Clifford and left Clifford ordered semigroups by their bi-ide...
This paper arose as a tribute to A. H. CLIFFORD and significant portions of it were presented at a c...
In this thesis we are concerned with arithmetic in a certain partially ordered, commutative semigrou...
Research Doctorate - Doctor of Philosophy (PhD)(**Note: this abstract is a plain text version of the...
In 1991, Lawson introduced three partial orders on reduced Usemiabundant semigroups. Their definitio...
In this paper we characterize both the Clifford and left Clifford ordered semigroups by their bi-ide...
AbstractIn this paper we consider the Stone-Čech compactifications of discrete semigroups which are ...
Exactly as in semigroups, Green’s relations play an important role in the theory of ordered semigrou...
We use ordered categories to study semidirect decompositions of finite ordered semigroups. We obtain...
We consider particular compatible orders on a given completely simple semigroup Sx=M((x);I,Λ;P) wher...
Investigations of the lattice of congruences on a semigroup have taken two different directions. One...
Inspired by the ring theory concepts of orders and classical rings of quotients, Fountain and Petric...