On Special Semigroups Derived From an Arbitrary Semigroup

Abstract

Let S be a semigroup, a non-empty set and P a mapping of into S. The set S× together with the operation P defined by (s, λ) P(t, μ )=(sP(λ)t, μ ) form a semigroup which is denoted by (S, , P). Using this construction, we prove a common connection between the semigroups S, S/θ and S/θ *=(S/θ)/(θ */θ), where θ and θ */θ are the kernels of the right regular representations of S and S/θ, respectively. We also prove an embedding theorem for the semigroup (S, S/θ , p), where S is a left equalizer simple semigroup without idempotents, and P maps every θ-class of S into itself.