Single radius spherical cap discrepancy via gegenbadly approximable numbers

Abstract

A celebrated result of Beck shows that for any set of N points on Sd there always exists a spherical cap B ⊂ Sd such that number of points in the cap deviates from the expected value σ(B) · N by at least N1/2 - 1/2d, where σ is the normalized surface measure. We refine the result and show that, when d 1 ~(mod~4), there exists a (small and very specific) set of real numbers such that for every r>0 from the set one is always guaranteed to find a spherical cap Cr with the given radius r for which the result holds. The main new ingredient is a generalization of the notion of badly approximable numbers to the setting of Gegenbauer polynomials: these are fixed numbers x ∈ (-1,1) such that the sequence of Gegenbauer polynomials (Cnλ(x))n=1∞ avoids being close to 0 in a precise quantitative sense.