Single radius spherical cap discrepancy on compact two-point homogeneous spaces

Abstract

In this note we study estimates from below of the single radius spherical discrepancy in the setting of compact two-point homogeneous spaces. Namely, given a d-dimensional manifold M endowed with a distance so that ( M, ) is a two-point homogeneous space and with the Riemannian measure μ, we provide conditions on r such that if Dr denotes the discrepancy of the ball of radius r, then, for an absolute constant C>0 and for every set of points \xj\j=1N, one has ∫ M |Dr(x)|2\, dμ(x)≥slant C N-1-1d. The conditions on r that we have depend on the dimension d of the manifold and cannot be achieved when d 1 \ ( mod4). Nonetheless, we prove a weaker estimate for such dimensions as well.