Zarankiewicz's problem for semilinear hypergraphs

Abstract

A bipartite graph H = (V1, V2; E ) with |V1| + |V2| = n is semilinear if Vi ⊂eq Rdi for some di and the edge relation E consists of the pairs of points (x1, x2) ∈ V1 × V2 satisfying a fixed Boolean combination of s linear equalities and inequalities in d1 + d2 variables for some s. We show that for a fixed k, the number of edges in a Kk,k-free semilinear H is almost linear in n, namely |E| = Os,k,(n1+) for any > 0; and more generally, |E| = Os,k,r,(nr-1 + ) for a Kk, …,k-free semilinear r-partite r-uniform hypergraph. As an application, we obtain the following incidence bound: given n1 points and n2 open boxes with axis parallel sides in Rd such that their incidence graph is Kk,k-free, there can be at most Ok,(n1+) incidences. The same bound holds if instead of boxes one takes polytopes cut out by the translates of an arbitrary fixed finite set of halfspaces. We also obtain matching upper and (superlinear) lower bounds in the case of dyadic boxes on the plane, and point out some connections to the model-theoretic trichotomy in o-minimal structures (showing that the failure of an almost linear bound for some definable graph allows one to recover the field operations from that graph in a definable manner).