Canonical Ramsey: triangles, rectangles and beyond
Abstract
In a seminal work, Cheng and Xu showed that if S is a square or a triangle with a certain property, then for every positive integer r there exists n0(S) independent of r such that every r-coloring of En with n n0(S) contains a monochromatic or a rainbow congruent copy of S. Geh\'er, Sagdeev, and T\'oth formalized this dimension independence as the canonical Ramsey property and proved it for all hypercubes, thereby covering rectangles whose squared aspect ratio (a/b)2 is rational. They asked whether this property holds for all triangles and for all rectangles. (1) We resolve both questions. More precisely, for triangles we confirm the property in E4 by developing a novel rotation-sphereical chaining argument. For rectangles, we introduce a structural reduction to product configurations of bounded color complexity, enabling the use of the simplex Ramsey theorem together with product Ramsey theorem. (2) Beyond this, we develop a concise perturbation framework based on an iterative embedding coupled with the Frankl-R\"odl simplex super-Ramsey theorem, which yields the canonical Ramsey property for a natural class of 3-dimensional simplices and also furnishes an alternative proof for triangles.
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