English

On random digraphs and cores

Combinatorics 2021-03-02 v1

Abstract

An acyclic homomorphism of a digraph CC to a digraph DD is a function ρ ⁣:V(C)V(D)\rho\colon V(C)\to V(D) such that for every arc uvuv of CC, either ρ(u)=ρ(v)\rho(u)=\rho(v), or ρ(u)ρ(v)\rho(u)\rho(v) is an arc of DD and for every vertex vV(D)v\in V(D), the subdigraph of CC induced by ρ1(v)\rho^{-1}(v) is acyclic. A digraph DD is a core if the only acyclic homomorphisms of DD to itself are automorphisms. In this paper, we prove that for certain choices of p(n)p(n), random digraphs DD(n,p(n))D\in D(n,p(n)) are asymptotically almost surely cores. For digraphs, this mirrors a result from [A. Bonato and P. Pra{\l}at, The good, the bad, and the great: homomorphisms and cores of random graphs, Discrete Math., 309 (2009), no. 18, 5535-5539; MR2567955] concerning random graphs and cores.

Keywords

Cite

@article{arxiv.2101.09751,
  title  = {On random digraphs and cores},
  author = {Esmaeil Parsa and P. Mark Kayll},
  journal= {arXiv preprint arXiv:2101.09751},
  year   = {2021}
}

Comments

9 pages, to appear in Australasian Journal of Combinatorics

R2 v1 2026-06-23T22:28:07.238Z