English

Counting Hamilton cycles in sparse random directed graphs

Combinatorics 2018-03-21 v2

Abstract

Let D(n,p) be the random directed graph on n vertices where each of the n(n-1) possible arcs is present independently with probability p. A celebrated result of Frieze shows that if p(logn+ω(1))/np\ge(\log n+\omega(1))/n then D(n,p) typically has a directed Hamilton cycle, and this is best possible. In this paper, we obtain a strengthening of this result, showing that under the same condition, the number of directed Hamilton cycles in D(n,p) is typically n!(p(1+o(1)))nn!(p(1+o(1)))^{n}. We also prove a hitting-time version of this statement, showing that in the random directed graph process, as soon as every vertex has in-/out-degrees at least 1, there are typically n!(logn/n(1+o(1)))nn!(\log n/n(1+o(1)))^{n} directed Hamilton cycles.

Keywords

Cite

@article{arxiv.1708.07746,
  title  = {Counting Hamilton cycles in sparse random directed graphs},
  author = {Asaf Ferber and Matthew Kwan and Benny Sudakov},
  journal= {arXiv preprint arXiv:1708.07746},
  year   = {2018}
}
R2 v1 2026-06-22T21:23:36.582Z