P\'osa rotation through a random permutation

Nemanja Dragani\'c; Peter Keevash

arXiv:2502.00489·math.CO·February 4, 2025

P\'osa rotation through a random permutation

Nemanja Dragani\'c, Peter Keevash

PDF

Open Access

TL;DR

None

Contribution

None

Abstract

What minimum degree of a graph $G$ on $n$ vertices guarantees that the union of $G$ and a random $2$ -factor (or permutation) is with high probability Hamiltonian? Gir\~ao and Espuny D{\'\i}az showed that the answer lies in the interval $[\frac{1}{5} lo g n, n^{3/4 + o (1)}]$ . We improve both the upper and lower bounds to resolve this problem asymptotically, showing that the answer is $(1 + o (1)) n lo g n /2$ . Furthermore, if $G$ is assumed to be (nearly) regular then we obtain the much stronger bound that any degree growing at least polylogarithmically in $n$ is sufficient for Hamiltonicity. Our proofs use some insights from the rich theory of random permutations and a randomised version of the classical technique of P\'osa rotation adapted to multiple exposure arguments.

Peer Reviews

No public reviews on file for this paper yet. If you reviewed it on a platform where reviews are public (OpenReview, ICLR, NeurIPS, ICML), you can paste yours below so the community can read it here.

Videos

No videos yet. Explain this paper in a talk, walkthrough, or lecture? Add one.

Taxonomy

TopicsMathematics and Applications · Computational Geometry and Mesh Generation · Mathematical Dynamics and Fractals