English

Large monochromatic components in expansive hypergraphs

Combinatorics 2024-11-20 v1

Abstract

A result of Gy\'arf\'as exactly determines the size of a largest monochromatic component in an arbitrary rr-coloring of the complete kk-uniform hypergraph KnkK_n^k when k2k\geq 2 and r1krr-1\leq k\leq r. We prove a result which says that if one replaces KnkK_n^k in Gy\'arf\'as' theorem by any ``expansive'' kk-uniform hypergraph on nn vertices (that is, a kk-uniform hypergraph HH on nn vertices in which in which e(V1,,Vk)>0e(V_1, \dots, V_k)>0 for all disjoint sets V1,,VkV(H)V_1, \dots, V_k\subseteq V(H) with Vi>α|V_i|>\alpha for all i[k]i\in [k]), then one gets a largest monochromatic component of essentially the same size (within a small error term depending on rr and α\alpha). As corollaries we recover a number of known results about large monochromatic components in random hypergraphs and random Steiner triple systems, often with drastically improved bounds on the error terms. Gy\'arf\'as' result is equivalent to the dual problem of determining the smallest maximum degree of an arbitrary rr-partite rr-uniform hypergraph with nn edges in which every set of kk edges has a common intersection. In this language, our result says that if one replaces the condition that every set of kk edges has a common intersection with the condition that for every collection of kk disjoint sets E1,,EkE(H)E_1, \dots, E_k\subseteq E(H) with Ei>α|E_i|>\alpha for all i[k]i\in [k] there exists eiEie_i\in E_i for all i[k]i\in [k] such that e1eke_1\cap \dots \cap e_k\neq \emptyset, then the maximum degree of HH is essentially the same (within a small error term depending on rr and α\alpha). We prove our results in this dual setting.

Keywords

Cite

@article{arxiv.2302.06669,
  title  = {Large monochromatic components in expansive hypergraphs},
  author = {Deepak Bal and Louis DeBiasio},
  journal= {arXiv preprint arXiv:2302.06669},
  year   = {2024}
}

Comments

18 pages

R2 v1 2026-06-28T08:39:14.521Z