Improved Ramsey bounds for generalized Schur equations
Abstract
We show that for m, r ∈ N and N > (2m+1)r (r!)1/m, every r-coloring of the integers in the interval [N] contains a monochromatic solution to the equation \[ x1 + … + … xm+1 = y1 + … + ym. \] This generalizes and improves recent results of Koścuiszko. We also show that if N ≥ 2r, then every r-coloring of the integers in [N] must always determine a monochromatic solution to the above equation for some m ≥ 1. The latter estimate is optimal.
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