English

Structural aspects of semigroups based on digraphs

Combinatorics 2017-06-20 v2

Abstract

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

Keywords

Cite

@article{arxiv.1704.00937,
  title  = {Structural aspects of semigroups based on digraphs},
  author = {James East and Maximilien Gadouleau and James D. Mitchell},
  journal= {arXiv preprint arXiv:1704.00937},
  year   = {2017}
}

Comments

20 pages

R2 v1 2026-06-22T19:07:04.373Z