Some remarks on the Zarankiewicz problem

Abstract

The Zarankiewicz problem asks for an estimate on z(m, n; s, t), the largest number of 1's in an m × n matrix with all entries 0 or 1 containing no s × t submatrix consisting entirely of 1's. We show that a classical upper bound for z(m, n; s, t) due to Kov\'ari, S\'os and Tur\'an is tight up to the constant for a broad range of parameters. The proof relies on a new quantitative variant of the random algebraic method.