Looping directions and integrals of eigenfunctions over submanifolds

Abstract

Let (M,g) be a compact n-dimensional Riemannian manifold without boundary and eλ be an L2-normalized eigenfunction of the Laplace-Beltrami operator with respect to the metric g, i.e \[ -g eλ = λ2 eλ and \| eλ \|L2(M) = 1. \] Let be a d-dimensional submanifold and dμ a smooth, compactly supported measure on . It is well-known (e.g. proved by Zelditch in far greater generality) that \[ ∫ eλ \, dμ = O(λn-d-12). \] We show this bound improves to o(λn-d-12) provided the set of looping directions, \[ L = \ (x,) ∈ SN* : t(x,) ∈ SN* for some t > 0 \ \] has measure zero as a subset of SN*, where here t is the geodesic flow on the cosphere bundle S*M and SN* is the unit conormal bundle over .