English

Packing and counting arbitrary Hamilton cycles in random digraphs

Combinatorics 2016-03-14 v1

Abstract

We prove packing and counting theorems for arbitrarily oriented Hamilton cycles in D(n,p){\cal D}(n,p) for nearly optimal pp (up to a logcn\log ^cn factor). In particular, we show that given t=(1o(1))npt = (1-o(1))np Hamilton cycles C1,,CtC_1,\ldots ,C_{t}, each of which is oriented arbitrarily, a digraph DD(n,p)D \sim {\cal D}(n,p) w.h.p. contains edge disjoint copies of C1,,CtC_1,\ldots ,C_t, provided p=ω(log3n/n)p=\omega(\log ^3 n/n). We also show that given an arbitrarily oriented nn-vertex cycle CC, a random digraph DD(n,p)D \sim {\cal D}(n,p) w.h.p. contains (1±o(1))n!pn(1\pm o(1))n!p^n copies of CC, provided plog1+o(1)n/np \geq \log ^{1 + o(1)}n/n.

Keywords

Cite

@article{arxiv.1603.03614,
  title  = {Packing and counting arbitrary Hamilton cycles in random digraphs},
  author = {Asaf Ferber and Eoin Long},
  journal= {arXiv preprint arXiv:1603.03614},
  year   = {2016}
}

Comments

13 pages

R2 v1 2026-06-22T13:08:50.057Z