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http://dx.doi.org/10.4134/JKMS.2011.48.2.289

SEMIGROUPS OF TRANSFORMATIONS WITH INVARIANT SET  

Honyam, Preeyanuch (DEPARTMENT OF MATHEMATICS CHIANG MAI UNIVERSITY)
Sanwong, Jintana (DEPARTMENT OF MATHEMATICS CHIANG MAI UNIVERSITY)
Publication Information
Journal of the Korean Mathematical Society / v.48, no.2, 2011 , pp. 289-300 More about this Journal
Abstract
Let T(X) denote the semigroup (under composition) of transformations from X into itself. For a fixed nonempty subset Y of X, let S(X, Y) = {${\alpha}\;{\in}\;T(X)\;:\;Y\;{\alpha}\;{\subseteq}\;Y$}. Then S(X, Y) is a semigroup of total transformations of X which leave a subset Y of X invariant. In this paper, we characterize when S(X, Y) is isomorphic to T(Z) for some set Z and prove that every semigroup A can be embedded in S($A^1$, A). Then we describe Green's relations for S(X, Y) and apply these results to obtain its group H-classes and ideals.
Keywords
transformation semigroups; Green's relations; ideals;
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