Extensions of semigroups by symmetric inverse semigroups of a bounded finite rank

Abstract

We study the semigroup extension Iλn(S) of a semigroup S by symmetric inverse semigroups of a bounded finite rank. We describe idempotents and regular elements of the semigroups Iλn(S) and Iλn(S) show that the semigroup Iλn(S) (Iλn(S)) is regular, orthodox, inverse or stable if and only if so is S. Green's relations are described on the semigroup Iλn(S) for an arbitrary monoid S. We introduce the conception of a semigroup with strongly tight ideal series, and proved that for any infinite cardinal λ and any positive integer n the semigroup Iλn(S) has a strongly tight ideal series provides so has S. At the finish we show that for every compact Hausdorff semitopological monoid (S,τS) there exists a unique its compact topological extension (Iλn(S),τIc) in the class of Haudorff semitopological semigroups.