On monoids of monotone injective partial selfmaps of Ln×lexZ with co-finite domains and images

Abstract

We study the semigroup I\!O\!∞(Znlex) of monotone injective partial selfmaps of the set of Ln×lexZ having co-finite domain and image, where Ln×lexZ is the lexicographic product of n-elements chain and the set of integers with the usual order. We show that I\!O\!∞(Znlex) is bisimple and establish its projective congruences. We prove that I\!O\!∞(Znlex) is finitely generated, and for n=1 every automorphism of I\!O\!∞(Znlex) is inner and show that in the case n≥slant 2 the semigroup I\!O\!∞(Znlex) has non-inner automorphisms. Also we show that every Baire topology τ on I\!O\!∞(Znlex) such that (I\!O\!∞(Znlex),τ) is a Hausdorff semitopological semigroup is discrete, construct a non-discrete Hausdorff semigroup inverse topology on I\!O\!∞(Znlex), and prove that the discrete semigroup I\!O\!∞(Znlex) cannot be embedded into some classes of compact-like topological semigroups and that its remainder under the closure in a topological semigroup S is an ideal in S.