English

Graphs with many strong orientations

Combinatorics 2016-04-11 v2

Abstract

We establish mild conditions under which a possibly irregular, sparse graph GG has "many" strong orientations. Given a graph GG on nn vertices, orient each edge in either direction with probability 1/21/2 independently. We show that if GG satisfies a minimum degree condition of (1+c1)log2n(1+c_1)\log_2{n} and has Cheeger constant at least c2log2log2nlog2nc_2\frac{\log_2\log_2{n}}{\log_2{n}}, then the resulting randomly oriented directed graph is strongly connected with high probability. This Cheeger constant bound can be replaced by an analogous spectral condition via the Cheeger inequality. Additionally, we provide an explicit construction to show our minimum degree condition is tight while the Cheeger constant bound is tight up to a log2log2n\log_2\log_2{n} factor.

Keywords

Cite

@article{arxiv.1505.00767,
  title  = {Graphs with many strong orientations},
  author = {Sinan Aksoy and Paul Horn},
  journal= {arXiv preprint arXiv:1505.00767},
  year   = {2016}
}

Comments

14 pages, 4 figures; revised version includes more background and minor changes that better clarify the exposition

R2 v1 2026-06-22T09:27:53.056Z