Polygons and multi-product of eigenfunctions

Abstract

Let M be a compact Riemannian manifold without boundary, with L2-normalized Laplace-Beltrami eigenfunctions \ej\j, which satisfy g ej = -λj2 ej. We study the following inner product of eigenfunctions \[ ei1 ei2 … eik, eik+1 = ∫ ei1 ei2… eik eik+1 \, dV. \] We show that, after a mild averaging in the frequency variables, the main 2-concentration of this inner product is determined by the measure of a set of configurations of (k+1)-gons whose side lengths are the frequencies λi1, λi2, …, λik+1. We prove that a rapidly vanishing proportion of this mass lies in the regime where λi1, λi2, …, λik+1 cannot occur as the side lengths of any (k+1)-gon.