Exponential Erdos-Szekeres theorem for matrices

Abstract

In 1993, Fishburn and Graham established the following qualitative extension of the classical Erdos-Szekeres theorem. If N is sufficiently large with respect to n, then any N× N real matrix contains an n× n submatrix in which every row and every column is monotone. We prove that the smallest such N is at most 2n4+o(1), greatly improving the previously best known double-exponential upper bound, and getting close to the best known lower bound nn/2. In particular, we prove the following surprising sharp transition in the asymmetric setting. On one hand, every 8n2× 2n4+o(1) matrix contains an n× n submatrix, in which every row is mononote. On the other hand, there exist n2/6× 22n1-o(1) matrices containing no such submatrix .