Conjugacy in inverse semigroups

Abstract

In a group G, elements a and b are conjugate if there exists g∈ G such that g-1 ag=b. This conjugacy relation, which plays an important role in group theory, can be extended in a natural way to inverse semigroups: for elements a and b in an inverse semigroup S, a is conjugate to b, which we will write as ai b, if there exists g∈ S1 such that g-1 ag=b and gbg-1 =a. The purpose of this paper is to study the conjugacy i in several classes of inverse semigroups: symmetric inverse semigroups, free inverse semigroups, McAllister P-semigroups, factorizable inverse monoids, Clifford semigroups, the bicyclic monoid and stable inverse semigroups.