Rainbow numbers of [m] × [n] for x1 + x2 = x3

Abstract

Consider the set [m]× [n] = \(i,j)\, : 1 i m, 1 j n\ and the equation x1+x2 = x3, namely eq. The rainbow number of [m] × [n] for eq, denoted rb([m]× [n],eq), is the smallest number of colors such that for every surjective rb([m]×[n], eq)-coloring of [m]× [n] there must exist a solution to eq, with component-wise addition, where every element of the solution set is assigned a distinct color. This paper determines that rb([m]× [n], eq) = m+n+1 for all values of m and n that a greater than or equal to 2.