On monoids of injective partial selfmaps almost everywhere the identity

Abstract

In this paper we study the semigroup I∞λ of injective partial selfmaps almost everywhere the identity of a set of infinite cardinality λ. We describe the Green relations on I∞λ, all (two-sided) ideals and all congruences of the semigroup I∞λ. We prove that every Hausdorff hereditary Baire topology τ on I∞ω such that (I∞ω,τ) is a semitopological semigroup is discrete and describe the closure of the discrete semigroup I∞λ in a topological semigroup. Also we show that for an infinite cardinal λ the discrete semigroup I∞λ does not embed into a compact topological semigroup and construct two non-discrete Hausdorff topologies turning I∞λ into a topological inverse semigroup.