On the semigroup generating by extended bicyclic semigroup and a ω-closed family

Abstract

The algebraic extension BZF of the extended bicyclic semigroup for an arbitrary ω-closed family F subsets of ω is introduced. It is proven that BZF is a combinatorial inverse semigroup. Green's relations, the natural partial order on the semigroup BZF and its set of idempotents are described. The criteria of simplicity, 0-simplicity, bisimplicity, 0-bisimplicity of the semigroup BZF and the criterion for BZF to be isomorphic to the extended bicyclic semigroup or the countable semigroup of matrix units are derived. It is proved that in the case when the family F consists of all singletons of ω and the empty set, the semigroup BZF is isomorphic to the Brandt λ-extension of the semilattice (ω,).