On Zarankiewicz's Problem for Intersection Hypergraphs of Geometric Objects

Abstract

The hypergraph Zarankiewicz's problem, introduced by Erdos in 1964, asks for the maximum number of hyperedges in an r-partite hypergraph with n vertices in each part that does not contain a copy of Kt,t,…,t. Erdos obtained a near optimal bound of O(nr-1/tr-1) for general hypergraphs. In recent years, several works obtained improved bounds under various algebraic assumptions -- e.g., if the hypergraph is semialgebraic. In this paper we study the problem in a geometric setting -- for r-partite intersection hypergraphs of families of geometric objects. Our main results are essentially sharp bounds for families of axis-parallel boxes in Rd and families of pseudo-discs. For axis-parallel boxes, we obtain the sharp bound Od,r(tnr-1( n n)d-1). The best previous bound was larger by a factor of about ( n)d(2r-1-2). For pseudo-discs, we obtain the bound Or(tnr-1( n)r-2), which is sharp up to logarithmic factors. As this hypergraph has no algebraic structure, no improvement of Erdos' 60-year-old O(nr-1/tr-1) bound was known for this setting. Futhermore, even in the special case of discs for which the semialgebraic structure can be used, our result improves the best known result by a factor of (n2r-23r-2). To obtain our results, we use the recently improved results for the graph Zarankiewicz's problem in the corresponding settings, along with a variety of combinatorial and geometric techniques, including shallow cuttings, biclique covers, transversals, and planarity.

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