Euclidean Gallai-Ramsey Theory

Abstract

In this paper, we introduce Euclidean Gallai-Ramsey theory, by combining Euclidean Ramsey theory and Gallai-Ramsey theory on graphs. More precisely, we consider the following problem: For an integer r and configurations K and K', does there exist an integer n0 such that for any r-coloring of the points of n-dimensional Euclidean space with n ≥ n0, there is a monochromatic configuration congruent to K or a rainbow configuration congruent to K'? In particular, we give a bound on n0 for some configurations K and K', such as triangles and rectangles. Those are extensions of ordinary Euclidean Ramsey theory where the purpose is to find a monochromatic configuration.