Topological monoids of monotone injective partial selfmaps of N with cofinite domain and image

Abstract

In this paper we study the semigroup I∞(N) of partial cofinal monotone bijective transformations of the set of positive integers N. We show that the semigroup I∞(N) has algebraic properties similar to the bicyclic semigroup: it is bisimple and all of its non-trivial group homomorphisms are either isomorphisms or group homomorphisms. We also prove that every locally compact topology τ on I∞(N) such that (I∞(N),τ) is a topological inverse semigroup, is discrete. Finally, we describe the closure of (I∞(N),τ) in a topological semigroup.