On powers of tight Hamilton cycles in randomly perturbed hypergraphs

Abstract

For integers k ≥ 3 and r≥ 2, we show that for every α> 0, there exists > 0 such that the union of k-uniform hypergraph on n vertices with minimum codegree at least α n and a binomial random k-uniform hypergraph G(k)(n,p) with p≥ n-k+r-2k-1-1- on the same vertex set contains the rth power of a tight Hamilton cycle with high probability. Moreover, a construction shows that one cannot take > Cα, where C=C(k,r) is a constant. Thus the bound on p is optimal up to the value of and this answers a question of Bedenknecht, Han, Kohayakawa, and Mota.