Polycyclic extensions of semigroups

Abstract

In the paper we introduce a notion of the Bruck-Reilly λ-polycyclic extension of a monoid S with a homomorphism θ which is an analogue of the Bruck-Reilly extension of a monoid S. We describe idempotens of the semigroup (Pλ(θ,S),*) and Green's relations on (Pλ(θ,S),*). It is proved that (Pλ(θ,S),*) is a 0-simple semigroup for any semigroup S. We find necessary and sufficient conditions on a monoid S and a homomorphism θ under which the semigroup (Pλ(θ,S),*) is regular, inverse, 0-bisimple, combinatorial, congruence free, or inverse 0-E-unitary. Also we study topologizations of the semigroup (Pλ(θ,S),*).