Fourier coefficients of restrictions of eigenfunctions

Abstract

Let \ej\ be an orthonormal basis of Laplace eigenfunctions of a compact Riemannian manifold (M,g). Let H ⊂ M be a submanifold and let \k\ be an orthonormal basis of Laplace eigenfunctions of H with the induced metric. We obtain joint asymptotics for the Fourier coefficients \[ γH ej, k L2(H) = ∫H ej k \, dVH, \] of restrictions γH ej of ej to H. In particular, we obtain asymptotics for the sums of the norm-squares of the Fourier coefficients over the joint spectrum \(μk, λj)\j,k - 0∞ of the (square roots of the) Laplacian M on M and the Laplacian H on H in a family of suitably `thick' regions in R2. Thick regions include (1) the truncated cone μk/λj ∈ [a,b] ⊂ (0,1) and λj ≤ λ, and (2) the slowly thickening strip |μk - cλj| ≤ w(λ) and λj ≤ λ, where w(λ) is monotonic and 1 w(λ) λ1 - 1/n. Key tools for obtaining these asymptotics include the composition calculus of Fourier integral operators and a new multidimensional Tauberian theorem.