Hamiltonicity in randomly perturbed hypergraphs

Abstract

For integers k 3 and 1 k-1, we prove that for any α>0, there exist ε>0 and C>0 such that for sufficiently large n∈ (k-)N, the union of a k-uniform hypergraph with minimum vertex degree α nk-1 and a binomial random k-uniform hypergraph G(k)(n,p) with p n-(k-)-ε for 2 and p C n-(k-1) for =1 on the same vertex set contains a Hamiltonian -cycle with high probability. Our result is best possible up to the values of ε and C and answers a question of Krivelevich, Kwan and Sudakov.