Endomorphisms of Finite Symmetric Inverse Semigroups

## Abstract A reflexive digraph is a pair (__X__, __ρ__), where __X__ is an arbitrary set and __ρ__ is a reflexive binary relation on __X__. Let __End__ (__X__, __ρ__) be the semigroup of endomorphisms of (__X__, __ρ__). We determine the group of automorphisms of __End__ (__X__, __ρ__) for: digraph

We study amalgamated free products in the category of inverse semigroups. Our approach is combinatorial. Graphical techniques are used to relate the structures of the inverse semigroups in a pushout square, and we then examine amalgamated free products. We show that an amalgam of inverse semigroups

We show that if a finitely presented Rees quotient of a free inverse semigroup ww xx has polynomial growth, then its growth series is in a certain subsemiring of ‫ގ‬ z . We present a procedure for calculating the degree of growth of such a semigroup and use it to determine the possible values for th

We generalise the classical Munn representation of an inverse semigroup with the introduction of what we call ordered representations of inverse semigroups. Both the Wagner᎐Preston Representation and the effective actions of O'Carroll and McAlister are examples of such representations. We show that