The Geodesic Restriction Problem for Arithmetic Spherical Harmonics

Abstract

Given a Riemannian manifold M and an L2-normalized Laplacian eigenfunction ψ on M with eigenvalue λ2, a general problem in analysis is to understand how the mass of ψ distributes around M. There are different ways to attack this problem. One of them is to analyze the Lp-norm of ψ restricted to a submanifold of M. Here, we concentrate on the case M=S2, p=2, and we restrict to geodesics of the sphere. Burq, Gérard, and Tzvetkov showed, for γ a geodesic of S2 (and indeed for more general surfaces), that ||ψ|γ||L2 λ1/4 and that this bound is optimal in general. In this paper, we specialize to the case in which ψ is an eigenfunction of all the Hecke operators on the sphere and consider the set of geodesics CD of S2 associated to fundamental discriminants D<0. By combining approaches of Ali and Magee, we improve the previous upper bound to ||ψ|CD||L2 D, λ for any >0, which is essentially sharp.