On a sharp lemma of Cassels and Montgomery on manifolds

Abstract

Let ( M,g) be a d-dimensional compact connected Riemannian manifold and let \ m\m=0+∞ be a complete sequence of orthonormal eigenfunctions of the Laplace-Beltrami operator on M. We show that there exists a positive constant C such that for all integers N and X and for all finite sequences of N points in M, \ x( j) \j=1N, and positive weights \ aj\j=1N we have \[ Σm=0X | Σj=1N aj m ( x( j) ) | 2≥ \ CXΣj=1Naj2,( Σj=1Naj) 2\.\]