The Zarankiewicz problem on tripartite graphs

Abstract

In 1975, Bollobás, Erdős, and Szemerédi asked for the smallest τ such that an n × n × n tripartite graph with minimum degree n + τ must contain Kt, t, t, conjecturing that τ= O(n1/2) for t = 2. We prove that τ= O(n1 - 1/t) which confirms their conjecture and is best possible assuming the widely believed conjecture that the Zarankiewicz number satisfies z(n; t) = Θ(n2 - 1/t). Our proof uses a density increment argument. We also construct an infinite family of extremal graphs that are pairwise far apart (requiring the change of Ω(n2) edges to get between any two).