English

Zarankiewicz's problem for semi-algebraic hypergraphs

Combinatorics 2018-10-02 v3

Abstract

Zarankiewicz's problem asks for the largest possible number of edges in a graph that does not contain a Ku,uK_{u,u} subgraph for a fixed positive integer uu. Recently, Fox, Pach, Sheffer, Sulk and Zahl considered this problem for semi-algebraic graphs, where vertices are points in Rd\mathbb{R}^d and edges are defined by some semi-algebraic relations. In this paper, we extend this idea to semi-algebraic hypergraphs. For each k2k\geq 2, we find an upper bound on the number of hyperedges in a kk-uniform kk-partite semi-algebraic hypergraph without Ku1,,ukK_{u_1,\dots,u_k} for fixed positive integers u1,,uku_1,\dots, u_k. When k=2k=2, this bound matches the one of Fox et.al. and when k=3k=3, it is O((mnp)2d2d+1+ε+m(np)dd+1+ε+n(mp)dd+1+ε+p(mn)dd+1+ε+mn+np+pm),O\left((mnp)^{\frac{2d}{2d+1}+\varepsilon}+m(np)^{\frac{d}{d+1}+\varepsilon}+n(mp)^{\frac{d}{d+1}+\varepsilon}+p(mn)^{\frac{d}{d+1}+\varepsilon}+mn+np+pm\right), where m,n,pm,n,p are the sizes of the parts of the tripartite hypergraph and ε\varepsilon is an arbitrarily small positive constant. We then present applications of this result to a variant of the unit area problem, the unit minor problem and intersection hypergraphs.

Keywords

Cite

@article{arxiv.1705.01979,
  title  = {Zarankiewicz's problem for semi-algebraic hypergraphs},
  author = {Thao Do},
  journal= {arXiv preprint arXiv:1705.01979},
  year   = {2018}
}
R2 v1 2026-06-22T19:37:32.388Z