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1.
Niovi Kehayopulu 《Mathematica Slovaca》2011,61(6):871-884
There are two definitions of Γ-semigroups and investigations for both of them in the bibliography. The definition given by
Sen in 1981, and the definition given by Sen and Saha in 1986. In this paper we show the way we pass from ordered semigroups
to ordered Γ-semigroups no matter which one of the two definitions we use. Moreover we show that, exactly as in ordered semigroups,
in many results of ordered Γ-semigroups points do not play any essential role, but the sets, which shows their pointless character.
Under the methodology using in this paper, all the results of ordered semigroups can be transferred into ordered Γ-semigroups. 相似文献
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3.
In this paper we prove that each ordered groupoid (resp. semigroup) S embeds in a complete distributive le-groupoid (resp.
le-semigroup) using the ordered groupoid (resp. semigroup) arising from S by the adjunction of a zero element. 相似文献
4.
The main result of the paper is a decomposition theorem of the left regular ordered semigroups into left regular and left simple semigroups. 相似文献
5.
We study the semilattice composition of ordered semigroups (a concept opposite to that of the semilattice decomposition),
using the ideal extensions.
The text was submitted by the authors in English. 相似文献
6.
An ordered semigroup S is called CS-indecomposable if the set S × S is the only complete semilattice congruence on S. In the
present paper we prove that each ordered semigroup is, uniquely, a complete semilattice of CS-indecomposable semigroups, which
means that it can be decomposed into CS-indecomposable components in a unique way. Furthermore, the CS-indecomposable ordered
semigroups are exactly the ordered semigroups that do not contain proper filters. Bibliography: 6 titles.
Published in Zapiski Nauchnykh Seminarov POMI, Vol. 343, 2007, pp. 222–232. 相似文献
7.
In this paper we prove that each right commutative, right cancellative ordered semigroup (S,.,??) can be embedded into a right cancellative ordered semigroup (T,??,?) such that (T,??) is left simple and right commutative. As a consequence, an ordered semigroup S which is both right commutative and right cancellative is embedded into an ordered semigroup T which is union of pairwise disjoint abelian groups, indexed by a left zero subsemigroup of?T. 相似文献
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We characterize the ordered semigroups which are decomposable into simple and regular components. We prove that each ordered semigroup which is both regular and intra-regular is decomposable into simple and regular semigroups, and the converse statement also holds. We also prove that an ordered semigroup S is both regular and intra-regular if and only if every bi-ideal of S is an intra-regular (resp. semisimple) subsemigroup of S. An ordered semigroup S is both regular and intra-regular if and only if the left (resp. right) ideals of S are right (resp. left) quasi-regular subsemigroups of S. We characterize the chains of simple and regular semigroups, and we prove that S is a complete semilattice of simple and regular semigroups if and only if S is a semilattice of simple and regular semigroups. While a semigroup which is both π-regular and intra-regular is a semilattice of simple and regular semigroups, this does not hold in ordered semigroups, in general. 相似文献
9.
We study the decomposition of left regular ordered semigroups into left regular components and the decomposition of intra-regular ordered semigroups into simple or intra-regular components, adding some additional information to the results considered in [KEHAYOPULU, N.: On left regular ordered semigroups, Math. Japon. 35 (1990), 1057–1060] and [KEHAYOPULU, N.: On intra-regular ordered semigroups, Semigroup Forum 46 (1993), 271–278]. We prove that an ordered semigroup S is left regular if and only if it is a semilattice (or a complete semilattice) of left regular semigroups, equivalently, it is a union of left regular subsemigroups of S. Moreover, S is left regular if and only if it is a union of pairwise disjoint left regular subsemigroups of S. The right analog also holds. The same result is true if we replace the words “left regular” by “intraregular”. Moreover, an ordered semigroup is intra-regular if and only if it is a semilattice (or a complete semilattice) of simple semigroups. On the other hand, if an ordered semigroup is a semilattice (or a complete semilattice) of left simple semigroups, then it is left regular, but the converse statement does not hold in general. Illustrative examples are given. 相似文献
10.
Communicated by Robert McFadden 相似文献