On inverse submonoids of the monoid of almost monotone injective co-finite partial selfmaps of positive integers

Abstract

In this paper we study submonoids of the monoid I∞\,\!\!\!(N) of almost monotone injective co-finite partial selfmaps of positive integers N. Let I∞\!(N) be a submonoid of I∞\,\!\!\!(N) which consists of cofinite monotone partial bijections of N and CN be a subsemigroup I∞\,\!\!\!(N) which is generated by the partial shift n n+1 and its inverse partial map. We show that every automorphism of a full inverse subsemigroup of I∞\!(N) which contains the semigroup CN is the identity map. We construct a submonoid IN∞[1] of I∞\,\!\!\!(N) with the following property: if S is an inverse submonoid of I∞\,\!\!\!(N) such that S contains IN∞[1] as a submonoid, then every non-identity congruence C on S is a group congruence. We show that if S is an inverse submonoid of I∞\,\!\!\!(N) such that S contains CN as a submonoid then S is simple and the quotient semigroup S/Cmg, where Cmg is minimum group congruence on S, is isomorphic to the additive group of integers. Also, we study topologizations of inverse submonoids of I∞\,\!\!\!(N) which contain CN and embeddings of such semigroups into compact-like topological semigroups.