Functorial properties of endo-Cayley constructions

Abstract

Given a semigroup S, a subset A ⊆ S and a semigroup endomorphism f on S, the endo-Cayley graph, denoted by endo-Cayf(S, A), is defined by taking S as the vertex set and making every vertex x adjacent to the vertex f (x) a with a ∈ A. In this paper, we describe the construction of the endo-Cayley graph of a semigroup as a functor and study certain reflection and preservation properties of this functor. Moreover, we find results related to several product constructions. © 2011 Pushpa Publishing House.