English

A natural barrier in random greedy hypergraph matching

Combinatorics 2019-10-09 v2

Abstract

Let r2r \ge 2 be a fixed constant and let H {\mathcal H} be an rr-uniform, DD-regular hypergraph on NN vertices. Assume further that D D \to \infty as NN \to \infty and that degrees of pairs of vertices in H{\mathcal H} are at most LL where L =D/(logN)ω(1)L \ = D/ (\log N)^{\omega(1)}. We consider the random greedy algorithm for forming a matching in H \mathcal{H}. We choose a matching at random by iteratively choosing edges uniformly at random to be in the matching and deleting all edges that share at least one vertex with a chosen edge before moving on to the next choice. This process terminates when there are no edges remaining in the graph. We show that with high probability the proportion of vertices of H {\mathcal H} that are not saturated by the final matching is at most (L/D)12(r1)+o(1) (L/D)^{ \frac{ 1}{ 2(r-1) } + o(1) } . This point is a natural barrier in the analysis of the random greedy hypergraph matching process.

Keywords

Cite

@article{arxiv.1210.3581,
  title  = {A natural barrier in random greedy hypergraph matching},
  author = {Patrick Bennett and Tom Bohman},
  journal= {arXiv preprint arXiv:1210.3581},
  year   = {2019}
}

Comments

12 pages

R2 v1 2026-06-21T22:20:47.047Z