Avoiding patterns in matrices via a small number of changes

Abstract

Let A=\A1,…, Ar\ be a partition of a set \1,…,m\×\1,…, n\ into r nonempty subsets, and A=(aij) be an m× n matrix. We say that A has a pattern A provided that aij=ai'j' if and only if (i,j),(i',j')∈ At for some t∈\1,…,r\. In this note we study the following function f defined on the set of all m× n matrices M with s distinct entries: f(M; A) is the smallest number of positions where the entries of M need to be changed such that the resulting matrix does not have any submatrix with pattern A. We give an asymptotically tight value for f(m,n; s, A) = \f(M; A): M is an m× n matrix with at most s distinct entries\ .