A resolution of the Gaussian hyperplane tessellation conjecture on the sphere

Abstract

We investigate how many hyperplanes with independent standard Gaussian directions one needs to produce a δ-uniform tessellation of a subset S of the Euclidean sphere, meaning that for any pair of points in S the fraction of hyperplanes separating them corresponds to their geodesic distance up to an additive error δ. It was conjectured that δ-2w*(S)2 Gaussian random hyperplanes are necessary and sufficient for this purpose, where w*(S) is the Gaussian complexity of S. We falsify this conjecture by constructing a set S where δ-3w*(S)2 Gaussian hyperplanes are necessary and sufficient.