Hypersphere-Based Restricting Conditions for Colorings of the Euclidean Space

Abstract

We study colorings of the Euclidean space constrained by hypersphere forcing conditions: if an admissible hypersphere, Sr(p), centered at a point p and of radius r contains a monochromatic set of points satisfying a certain property P, then the center of the hypersphere must have that color. These forcing conditions may be restricted in applicability to a specific set of hyperspheres Sr(p). For cardinality-based forcing conditions we prove a general theorem: for countably many colors and any uncountable set of admissible radii R, such a coloring is locally monochromatic on any admissible center set ⊂eq Rn (hence constant, for connected ). For rigid geometric properties (simplex shape, edge-length, volume constraints) we show that forcing conditions alone are insufficient without regularity assumptions. Our main result shows that for colorings satisfying a certain Baire regularity condition rigid geometric properties enforce local monochromaticity and, in the presence of a certain ``uniform cap" condition, global monochromaticity. Applications include dichotomies for edge-length and volume constraints in terms of ∈f(L) and ∈f(V), and a comeagerness criterion in the ``all edges in L'' regime.