English

Majority Edge Colouring of Hypergraph

Combinatorics 2026-03-31 v2

Abstract

Motivated by recent work on majority edge-colourings of graphs, we initiate the study of the corresponding problem for hypergraphs. First, sharpening the probabilistic argument by a KLKL large-deviation estimate, we obtain a sufficient minimum-degree condition of order k3log(kr)k^3\log(kr) with the sharp large-deviation constant Ik:=D ⁣(1k1k+1)=Θ(k3), I_k:=D\!\left(\frac1k\middle\|\frac1{k+1}\right)=\Theta(k^{-3}), where D()D(\cdot\|\cdot) denotes the binary relative entropy. Our main constructive result shows that every hypergraph of rank at most rr and minimum degree at least 2rk22rk^2 admits a 1/k1/k-majority (k+1)(k+1)-edge-colouring. The proof is based on a hypergraph extension of the key discrepancy lemma used in the graph case. We also show that the logarithmic dependence on the rank can be determined asymptotically. If μk(r)\mu_k(r) denotes the least minimum-degree threshold that guarantees a 1/k1/k-majority (k+1)(k+1)-edge-colouring for all hypergraphs of rank at most rr, then for every fixed k2k\ge2, μk(r)=logrIk+Ok(loglogr). \mu_k(r)=\frac{\log r}{I_k}+O_k(\log\log r). In particular, the correct logarithmic threshold is of order k3logrk^3\log r. Finally, we determine the correct order of the degree--colour trade-off. For integers k2k\ge2, p1p\ge1, and r2r\ge2, let νk,p(r)\nu_{k,p}(r) denote the least integer qq such that every hypergraph of rank at most rr and minimum degree at least kpkp admits a 1/k1/k-majority qq-edge-colouring. Then νk,p(r)=Θk,p(r1/p). \nu_{k,p}(r)=\Theta_{k,p}(r^{1/p}). In particular, minimum degree at least k2kk^2-k guarantees a 1/k1/k-majority Ok(r1/(k1))O_k(r^{1/(k-1)})-edge-colouring, and this exponent is best possible.

Keywords

Cite

@article{arxiv.2509.22157,
  title  = {Majority Edge Colouring of Hypergraph},
  author = {Jiangdong Ai and Feiyu Nan},
  journal= {arXiv preprint arXiv:2509.22157},
  year   = {2026}
}
R2 v1 2026-07-01T05:58:27.993Z