English

Tight Hamilton cycles with high discrepancy

Combinatorics 2025-07-02 v2

Abstract

In this paper, we study discrepancy questions for spanning subgraphs of kk-uniform hypergraphs. Our main result is that, for any integers k3k \ge 3 and r2r \ge 2, any rr-colouring of the edges of a kk-uniform nn-vertex hypergraph GG with minimum (k1)(k-1)-degree δ(G)(1/2+o(1))n\delta(G) \ge (1/2+o(1))n contains a tight Hamilton cycle with high discrepancy, that is, with at least n/r+Ω(n)n/r+\Omega(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.

Keywords

Cite

@article{arxiv.2312.09976,
  title  = {Tight Hamilton cycles with high discrepancy},
  author = {Lior Gishboliner and Stefan Glock and Amedeo Sgueglia},
  journal= {arXiv preprint arXiv:2312.09976},
  year   = {2025}
}

Comments

21 pages, 1 figure; final version as accepted for publication in Combinatorics, Probability and Computing

R2 v1 2026-06-28T13:52:41.760Z