Monochromatic unit equilateral triangle on low-dimensional spheres

Abstract

A result of Matoušek and Rödl in 1995 states that for every >0 and every triangle T with circumradius ρ(T), there exists a dimension n=n(,T) such that every 2-coloring of the n-dimensional sphere of radius ρ(T)+, namely Sn(ρ(T)+), contains a monochromatic congruent copy of T. In this paper, we determine the exact threshold dimension for the unit equilateral triangle on the sphere Sn(1/2): there exists a 2-coloring of S2(1/2) with no monochromatic unit equilateral triangle, whereas every 2-coloring of S3(1/2) contains one. Along the way, we also establish several further Euclidean Ramsey-type results on low-dimensional spheres, including asymmetric and isosceles variants.