Restriction of eigenfunctions to totally geodesic submanifolds

Abstract

This article is about two types of restrictions of eigenfunctions φj on a compact Riemannian manifold (M,g): First, we restrict to a submanifold H ⊂ M, and expand the restriction γH φj in eigenfunctions ek of H. We then Fourier restrict γH φj to a short interval of eigenvalues of H. Laplace eigenvalues of M are denoted λj2 and those of H are denoted μk2. The Fourier coefficients are negligible unless the H- eigenvalues lie in the interval μk ∈ [-λj, λj]. The short windows have the form |μk - c λj| < ε. The goal is to obtain asymptotics and estimates of the Fourier coefficients of γH φj and to see how they vary with c. In prior work with E. L. Wyman and Y. Xi, we obtained asymptotics for sums over (μk, λj) in such windows for 0 < c < 1. In this article, we obtain `edge' asymptotics when c=1 and H is totally geodesic. The order of magnitude and leading coefficient are very different from the case c<1. In particular, they depend on the dimension of H. We explain how to bridge the bulk results and edge results.