Rectangle Free Coloring of Grids

Abstract

A two-dimensional grid is a set = [n]×[m]. A grid is c-colorable if there is a function n,m: [c] such that there are no rectangles with all four corners the same color. We address the following question: for which values of n and m is c-colorable? This problem can be viewed as a bipartite Ramsey problem and is related to a the Gallai-Witt theorem (also called the multidimensioanl Van Der Waerden's Theorem). We determine (1) exactly which grids are 2-colorable, (2) exactly which grids are 3-colorable, and (3) exactly which grids are 4-colorable. We use combinatorics, finite fields, and tournament graphs.