A Note on Semigroup Algebras of Permutable Semigroups

Abstract

Let S be a semigroup and F be a field. For an ideal J of the semigroup algebra F[S] of S over F, let J denote the restriction (to S) of the congruence on F[S] defined by the ideal J. A semigroup S is called a permutable semigroup if α β =β α is satisfied for all congruences α and β of S. In this paper we show that if S is a semilattice or a rectangular band then \S; F\:\ J J is a homomorphism of the semigroup (Con ( F[S]); ) into the relations semigroup ( BS; ) if and only if S is a permutable semigroup.