The monoid of order isomorphisms of principal filters of a power of the positive integers

Abstract

Let n be any positive integer and I\!\!P\!F(Nn) be the semigroup of all order isomorphisms between principal filters of the n-th power of the set of positive integers N with the product order. We study algebraic properties of the semigroup I\!\!P\!F(Nn). In particular, we show that I\!\!P\!F(Nn) is a bisimple, E-unitary, F-inverse semigroup, describe Green's relations on I\!\!P\!F(Nn) and its maximal subgroups. We show that the semigroup I\!\!P\!F(Nn) is isomorphic to the semidirect product of the direct n-th power of the bicyclic monoid Cn(p,q) by the group of permutation Sn. Also we prove that every non-identity congruence C on the semigroup I\!\!P\!F(Nn) is group and describe the least group congruence on I\!\!P\!F(Nn). We show that every Hausdorff shift-continuous topology on I\!\!P\!F(Nn) is discrete and discuss embedding of the semigroup I\!\!P\!F(Nn) into compact-like topological semigroups.