Short proofs for long induced paths

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 Rind(Pn)≤ 5· 107n, 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 uczak. We also provide a bound for the k-color version, showing that Rindk(Pn)=O(k34k)n. Finally, we present a new short proof of the fact that the binomial random graph in the supercritical regime, G(n,1+n), contains typically an induced path of length (2) n.

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