General and Refined Montgomery Lemmata

Abstract

Montgomery's Lemma on the torus Td states that a sum of N Dirac masses cannot be orthogonal to many low-frequency trigonometric functions in a quantified way. We provide an extension to general manifolds that also allows for positive weights: let (M,g) be a smooth compact d-dimensional manifold without boundary, let (φk)k=0∞ denote the Laplacian eigenfunctions, let \ x1, …, xN\ ⊂ M be a set of points and \a1, …, aN\ ⊂ R≥ 0 be a sequence of nonnegative weights. Then Σk=0X | Σn=1N an φk(xn) |2 (M,g) (Σi=1Nai2 ) X(X)d2. This result is sharp up to the logarithmic factor. Furthermore, we prove a refined spherical version of Montgomery's Lemma, and provide applications to estimates of discrepancy and discrete energies of N points on the sphere Sd.