On the monoid of monotone injective partial selfmaps of N2≤slant with cofinite domains and images, II

Abstract

Let N2≤slant be the set N2 with the partial order defined as the product of usual order ≤ on the set of positive integers N. We study the semigroup P\!O\!∞(N2≤slant) of monotone injective partial selfmaps of N2≤slant having cofinite domain and image. We describe the natural partial order on P\!O\!∞(N2≤slant) and show that it coincides with the natural partial order which is induced from symmetric inverse monoid IN×N onto P\!O\!∞(N2≤slant). We proved that the semigroup P\!O\!∞(N2≤slant) is isomorphic to the semidirect product P\!O\!∞\,+(N2≤slant) Z2 of the monoid P\!O\!∞\,+(N2≤slant) of orientation-preserving monotone injective partial selfmaps of N2≤slant with cofinite domains and images by the cyclic group Z2 of the order two. Also we describe the congruence σ on P\!O\!∞(N2≤slant) which is generated by the natural order on the semigroup P\!O\!∞(N2≤slant). We prove that the quotient semigroup P\!O\!∞\,+(N2≤slant)/σ is isomorphic to the free commutative monoid AMω over an infinite countable set and show that the quotient semigroup P\!O\!∞(N2≤slant)/σ is isomorphic to the semidirect product of the free commutative monoid AMω by Z2.