Structural aspects of semigroups based on digraphs

Abstract

Given any digraph D without loops or multiple arcs, there is a natural construction of a semigroup D of transformations. To every arc (a,b) of D is associated the idempotent transformation (a b) mapping a to b and fixing all vertices other than a. The semigroup D is generated by the idempotent transformations (a b) for all arcs (a,b) of D. In this paper, we consider the question of when there is a transformation in D containing a large cycle, and, for fixed k∈ N, we give a linear time algorithm to verify if D contains a transformation with a cycle of length k. We also classify those digraphs D such that D has one of the following properties: inverse, completely regular, commutative, simple, 0-simple, a semilattice, a rectangular band, congruence-free, is K-trivial or K-universal where K is any of Green's H-, L-, R-, or J-relation, and when D has a left, right, or two-sided zero.