Powers of Hamilton cycles in random graphs and tight Hamilton cycles in random hypergraphs

Abstract

We show that for every k ∈ N there exists C > 0 such that if pk C 8 n / n then asymptotically almost surely the random graph Gn,p contains the kth power of a Hamilton cycle. This determines the threshold for appearance of the square of a Hamilton cycle up to the logarithmic factor, improving a result of K\"uhn and Osthus. Moreover, our proof provides a randomized quasi-polynomial algorithm for finding such powers of cycles. Using similar ideas, we also give a randomized quasi-polynomial algorithm for finding a tight Hamilton cycle in the random k-uniform hypergraph Gn,p(k) for p C 8 n/ n. The proofs are based on the absorbing method and follow the strategy of K\"uhn and Osthus, and Allen et al. The new ingredient is a general Connecting Lemma which allows us to connect tuples of vertices using arbitrary structures at a nearly optimal value of p. Both the Connecting Lemma and its proof, which is based on Janson's inequality and a greedy embedding strategy, might be of independent interest.