English

Random directed graphs are robustly Hamiltonian

Combinatorics 2014-04-21 v1

Abstract

A classical theorem of Ghouila-Houri from 1960 asserts that every directed graph on nn vertices with minimum out-degree and in-degree at least n/2n/2 contains a directed Hamilton cycle. In this paper we extend this theorem to a random directed graph D(n,p){\mathcal D}(n,p), that is, a directed graph in which every ordered pair (u,v)(u,v) becomes an arc with probability pp independently of all other pairs. Motivated by the study of resilience of properties of random graphs, we prove that if plogn/np \gg \log n/\sqrt{n}, then a.a.s. every subdigraph of D(n,p){\mathcal D}(n,p) with minimum out-degree and in-degree at least (1/2+o(1))np(1/2 + o(1)) n p contains a directed Hamilton cycle. The constant 1/21/2 is asymptotically best possible. Our result also strengthens classical results about the existence of directed Hamilton cycles in random directed graphs.

Keywords

Cite

@article{arxiv.1404.4734,
  title  = {Random directed graphs are robustly Hamiltonian},
  author = {Dan Hefetz and Angelika Steger and Benny Sudakov},
  journal= {arXiv preprint arXiv:1404.4734},
  year   = {2014}
}

Comments

35 pages, 1 figure

R2 v1 2026-06-22T03:53:35.715Z