Green’s Relations and Regularity for Semigroups of Transformations with Restricted Range that Preserve Double Direction Equivalence Relations

Utsithon Chaichompoo, Kritsada Sangkhanan

Authors

  • Support Team

Keywords:

transformation semigroup, equivalence, regular element, Green’s relations

Abstract

Let $T(X)$ be the full transformation semigroup on a set $X$. For an equivalence $E$ on $X$ and a nonempty subset $Y$ of $X$, let $$T_{E^*}(X,Y)=\{ \alpha\in T(X):X\alpha\subseteq Y\ \text{and}\ \forall x,y\in X,(x,y)\in E\Leftrightarrow (x\alpha,y\alpha)\in E\}.$$ In this article, we give a necessary and sufficient condition for $T_{E^*}(X,Y)$ to be a subsemigroup of $T(X)$ under the composition of functions and study the regularity of $T_{E^*}(X,Y)$. Finally, we characterize Green's relations on this semigroup.

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Published

2019-11-22

How to Cite

Team, S. (2019). Green’s Relations and Regularity for Semigroups of Transformations with Restricted Range that Preserve Double Direction Equivalence Relations: Utsithon Chaichompoo, Kritsada Sangkhanan. Thai Journal of Mathematics. Retrieved from https://thaijmath2.in.cmu.ac.th/index.php/thaijmath/article/view/853