On monochromatic solutions to linear equations over the integers

Abstract

We study the number of monochromatic solutions to linear equations in a 2-coloring of \1,…,n\. We show that any nontrivial linear equation has a constant fraction of solutions that are monochromatic in any 2-coloring of \1,…,n\. We further study commonness of four-term equations and disprove a conjecture of Costello and Elvin by showing that, unlike over Fp, the four-term equation x1 + 2x2 - x3 - 2x4 = 0 is uncommon over \1,…,n\.

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