Sharp threshold for Hamilton cycles in randomly perturbed sparse graphs

Abstract

We determine the sharp threshold for Hamilton cycles in randomly perturbed sparse graphs. For any α=α(n)=o(1), let Gα be an n-vertex graph with minimum degree δ(Gα)αn. We prove that if p(1+)(1/α)n, then the union Gα G(n,p) is Hamiltonian asymptotically almost surely. This significantly strengthens a recent result of Hahn-Klimroth, Maesaka, Mogge, Mohr, and Parczyk by improving the leading constant from 6 to the optimal value of 1. Crucially, we show that this bound on p is best possible when αn→∞, thereby establishing the exact probability threshold for Hamiltonicity in this sparse regime. Our proof relies on a robust random expansion lemma, Pósa's booster lemma, and a sprinkling argument.