English

Sharp threshold for embedding combs and other spanning trees in random graphs

Combinatorics 2014-05-27 v1

Abstract

When knk|n, the tree Combn,k\mathrm{Comb}_{n,k} consists of a path containing n/kn/k vertices, each of whose vertices has a disjoint path length k1k-1 beginning at it. We show that, for any k=k(n)k=k(n) and ϵ>0\epsilon>0, the binomial random graph G(n,(1+ϵ)logn/n)\mathcal{G}(n,(1+\epsilon)\log n/ n) almost surely contains Combn,k\mathrm{Comb}_{n,k} as a subgraph. This improves a recent result of Kahn, Lubetzky and Wormald. We prove a similar statement for a more general class of trees containing both these combs and all bounded degree spanning trees which have at least ϵn/log9n\epsilon n/ \log^9n disjoint bare paths length log9n\lceil\log^9 n\rceil. We also give an efficient method for finding large expander subgraphs in a binomial random graph. This allows us to improve a result on almost spanning trees by Balogh, Csaba, Pei and Samotij.

Keywords

Cite

@article{arxiv.1405.6560,
  title  = {Sharp threshold for embedding combs and other spanning trees in random graphs},
  author = {Richard Montgomery},
  journal= {arXiv preprint arXiv:1405.6560},
  year   = {2014}
}

Comments

20 pages

R2 v1 2026-06-22T04:23:18.141Z