Add to ORKGIn the literature of ideals a left ideal L of a system S has usually been defined by the inclusion of SL ⊆ L and a right ideal R by the inclusion RS ⊆ R. On the other hand a left zero element z is usually defined by the equation za = z and a right zero element by the equation az = z ; similarly a left or right identity element e is defined by the equation ea = a or ae = a respectively. The author has in this paper made the terms left and right when applied to ideals consistent with the use of the terms left and right when applied to zeros or identities; thus L is a left ideal of a multiplicative system S if LS ⊆ L ; and R is a right ideal of S if SR ⊆ R. The reader is therefore cautioned to interchange the words left and right throughout th...
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summary:A necessary and sufficient condition is given for a) a principal left ideal $L(s,t)$ in $S\t...
It is well-known that a semigroup is a group if it has a right-identity and right-inverses. A questi...
In [3] a notion of a covered ideal was introduced. The aim of the present paper is to show some othe...
The purpose of the presented paper is to study the structure of semigroups of following types: 1. se...
Right wnes are semigroups with a left cancellation law such that for any two elements a, b there exi...
In [4] and [5] the structure of semigroups having both one-sided and two-sided bases has been invest...
AbstractA semigroup S (with zero) is called a right inverse semigroup if every (nonnull) principal l...
summary:In the paper, the following concept are defined: (i) a minimal left (right, two-sided) ideal...
The concept of prime ideal, which arises in the theory of rings as a generalization of the concept o...
This paper is an extension of the results of papers [3] and [5]. The first three theorems of this pa...
The notions of hybrid subsemigroups and hybrid left (resp., right) ideals in semigroups are introduc...
In the first part of the paper the foundations of the theory of polars are generalized from lattice ...
Using left ideals, right ideals, and the smallest two sided ideal in a compact right topological sem...
Suppose V is an infinite-dimensional vector space and let T(V ) denote the semigroup (under composi...
License, which permits unrestricted use, distribution, and reproduction in any medium, provided the ...
summary:A necessary and sufficient condition is given for a) a principal left ideal $L(s,t)$ in $S\t...
It is well-known that a semigroup is a group if it has a right-identity and right-inverses. A questi...
In [3] a notion of a covered ideal was introduced. The aim of the present paper is to show some othe...
The purpose of the presented paper is to study the structure of semigroups of following types: 1. se...
Right wnes are semigroups with a left cancellation law such that for any two elements a, b there exi...
In [4] and [5] the structure of semigroups having both one-sided and two-sided bases has been invest...
AbstractA semigroup S (with zero) is called a right inverse semigroup if every (nonnull) principal l...
summary:In the paper, the following concept are defined: (i) a minimal left (right, two-sided) ideal...
The concept of prime ideal, which arises in the theory of rings as a generalization of the concept o...
This paper is an extension of the results of papers [3] and [5]. The first three theorems of this pa...
The notions of hybrid subsemigroups and hybrid left (resp., right) ideals in semigroups are introduc...
In the first part of the paper the foundations of the theory of polars are generalized from lattice ...
Using left ideals, right ideals, and the smallest two sided ideal in a compact right topological sem...
Suppose V is an infinite-dimensional vector space and let T(V ) denote the semigroup (under composi...
License, which permits unrestricted use, distribution, and reproduction in any medium, provided the ...
summary:A necessary and sufficient condition is given for a) a principal left ideal $L(s,t)$ in $S\t...
It is well-known that a semigroup is a group if it has a right-identity and right-inverses. A questi...