Tight Hamilton cycles with high discrepancy
Abstract
In this paper, we study discrepancy questions for spanning subgraphs of k-uniform hypergraphs. Our main result is that, for any integers k 3 and r 2, any r-colouring of the edges of a k-uniform n-vertex hypergraph G with minimum (k-1)-degree δ(G) (1/2+o(1))n contains a tight Hamilton cycle with high discrepancy, that is, with at least n/r+(n) edges of one colour. The minimum degree condition is asymptotically best possible and our theorem also implies a corresponding result for perfect matchings. Our tools combine various structural techniques such as Tur\'an-type problems and hypergraph shadows with probabilistic techniques such as random walks and the nibble method. We also propose several intriguing problems for future research.
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