On some generalization of the bicyclic monoid

Abstract

We introduce an algebraic extension BωF of the bicyclic monoid for an arbitrary ω-closed family F subsets of ω which generalizes the bicyclic monoid, the countable semigroup of matrix units and some other combinatorial inverse semigroups. It is proved that BωF is a combinatorial inverse semigroup and Green's relations, the natural partial order on BωF, and its set of idempotents are described. We provide criteria of simplicity, 0-simplicity, bisimplicity, 0-bisimplicity of the semigroup BωF and when BωF has the identity, is isomorphic to the bicyclic semigroup or the countable semigroup of matrix units.