P\'osa rotation through a random permutation

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\'az showed that the answer lies in the interval [15 n, n3/4+o(1)]. We improve both the upper and lower bounds to resolve this problem asymptotically, showing that the answer is (1+o(1))n 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.

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