Large homogeneous submatrices

Abstract

A matrix is homogeneous if all of its entries are equal. Let P be a 2× 2 zero-one matrix that is not homogeneous. We prove that if an n× n zero-one matrix A does not contain P as a submatrix, then A has an cn× cn homogeneous submatrix for a suitable constant c>0. We further provide an almost complete characterization of the matrices P (missing only finitely many cases) such that forbidding P in A guarantees an n1-o(1)× n1-o(1) homogeneous submatrix. We apply our results to chordal bipartite graphs, totally balanced matrices, halfplane-arrangements and string graphs.