Hamilton -cycles in randomly-perturbed hypergraphs
Abstract
We prove that for integers 2 ≤ < k and a small constant c, if a k-uniform hypergraph with linear minimum codegree is randomly `perturbed' by changing non-edges to edges independently at random with probability p ≥ O(n-(k-)-c), then with high probability the resulting k-uniform hypergraph contains a Hamilton -cycle. This complements a recent analogous result for Hamilton 1-cycles due to Krivelevich, Kwan and Sudakov, and a comparable theorem in the graph case due to Bohman, Frieze and Martin.
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