The monoid of order isomorphisms between principal filters of σN^

Abstract

Consider the following generalization of the bicyclic monoid. Let be any infinite cardinal and let IP\!F(σN) be the semigroup of all order isomorphisms between principal filters of the set σN with the product order. We shall study algebraic properties of the semigroup IP\!F(σN), show that it is bisimple, E-unitary, F-inverse semigroup, describe Green's relations on IP\!F(σN), describe the group of units H(I) of the semigroup IP\!F(σN) and describe its maximal subgroups. We prove that the semigroup IP\!F(σN) is isomorphic to the semidirect product SσB of the semigroup σB by the group S, show that every non-identity congruence C on the semigroup IP\!F(σN) is a group congruence and describe the least group congruence on IP\!F(σN).