On the Least (Ordered) Semilattice Congruence in Ordered $\Gamma$-Semigroups: M. Siripitukdet, A. Iampan

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On the Least (Ordered) Semilattice Congruence in Ordered $\Gamma$-Semigroups

M. Siripitukdet, A. Iampan

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Abstract

In this paper, we firstly characterize the relationship between the(ordered) filters, (ordered) s-prime ideals and (ordered) semilattice congruences in ordered $\Gamma$-semigroups. Finally, we give some characterizations of semilattice congruences and ordered semilattice congruences on ordered $\Gamma$-semigroups and prove that

1. n is the least semilattice congruence,

2. N is the least ordered semilattice congruence,

3. N is not the least semilattice congruence in general.

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Published

2006-12-01

How to Cite

Team, S. (2006). On the Least (Ordered) Semilattice Congruence in Ordered $\Gamma$-Semigroups: M. Siripitukdet, A. Iampan. Thai Journal of Mathematics, 4(2), 403–415. Retrieved from https://thaijmath2.in.cmu.ac.th/index.php/thaijmath/article/view/60