On variants of the extended bicyclic semigroup

Abstract

In the paper we describe the group Aut(CZ) of automorphisms of the extended bicyclic semigroup CZ and study the variants CZm,n of the extended bicycle semigroup CZ, where m,n∈Z. In particular, we prove that Aut(CZ) is isomorphic to the additive group of integers, the extended bicyclic semigroup CZ and every its variant are not finitely generated, and describe the subset of idempotents E(CZm,n) and Green's relations on the semigroup CZm,n. Also we show that E(CZm,n) is an ω-chain and any two variants of the extended bicyclic semigroup CZ are isomorphic. At the end we discuss shift-continuous Hausdorff topologies on the variant CZ0,0. In particular, we prove that if τ is a Hausdorff shift-continuous topology on CZ0,0 then each of inequalities a>0 or b>0 implies that (a,b) is an isolated point of (CZ0,0,τ) and construct an example of a Hausdorff semigroup topology τ* on the semigroup CZ0,0 such that all its points with ab≤slant 0 and a+b≤slant 0 are not isolated in (CZ0,0,τ*).