English

Short proofs for long induced paths

Combinatorics 2022-03-02 v2

Abstract

We present a modification of the Depth first search algorithm, suited for finding long induced paths. We use it to give simple proofs of the following results. We show that the induced size-Ramsey number of paths satisfies R^ind(Pn)5107n\hat{R}_{\mathrm{ind}}(P_n)\leq 5\cdot 10^7n, thus giving an explicit constant in the linear bound, improving the previous bound with a large constant from a regularity lemma argument by Haxell, Kohayakawa and {\L}uczak. We also provide a bound for the kk-color version, showing that R^indk(Pn)=O(k3log4k)n\hat{R}_{\mathrm{ind}}^k(P_n)=O(k^3\log^4k)n. Finally, we present a new short proof of the fact that the binomial random graph in the supercritical regime, G(n,1+εn)G(n,\frac{1+\varepsilon}{n}), contains typically an induced path of length Θ(ε2)n\Theta(\varepsilon^2) n.

Keywords

Cite

@article{arxiv.2106.08975,
  title  = {Short proofs for long induced paths},
  author = {Nemanja Draganić and Stefan Glock and Michael Krivelevich},
  journal= {arXiv preprint arXiv:2106.08975},
  year   = {2022}
}

Comments

to appear in CPC

R2 v1 2026-06-24T03:16:50.038Z