Geodesic bi-angles and Fourier coefficients of restrictions of eigenfunctions

Abstract

This article concerns joint asymptotics of Fourier coefficients of restrictions of Laplace eigenfunctions φj of a compact Riemannian manifold to a submanifold H ⊂ M. We fix a number c ∈ (0,1) and study the asymptotics of the thin sums, Nc ε, H (λ): = Σj, λj ≤ λ Σk: |μk - c λj | < ε | ∫H φj kdVH |2 where \λj\ are the eigenvalues of -M, and \(μk, k)\ are the eigenvalues, resp. eigenfunctions, of -H. The inner sums represent the `jumps' of Nc ε, H (λ) and reflect the geometry of geodesic c-bi-angles with one leg on H and a second leg on M with the same endpoints and compatible initial tangent vectors ∈ ScH M, πH ∈ B* H, where πH is the orthogonal projection of to H. A c-bi-angle occurs when |πH ||| = c. Smoothed sums in μk are also studied, and give sharp estimates on the jumps. The jumps themselves may jump as ε varies, at certain values of ε related to periodicities in the c-bi-angle geometry. Subspheres of spheres and certain subtori of tori illustrate these jumps. The results refine those of the previous article (arXiv:2011.11571) where the inner sums run over k: | μkλj - c| ≤ ε and where geodesic bi-angles do not play a role.