Localization properties of high energy eigenfunctions on flat tori

Abstract: We consider the question of when the Laplace eigenfunctions on an arbitrary flat torus T Γ := R d /Γ are flexible enough to approximate, over the natural length scale of order 1/ √ λ where λ ≫ 1 is the eigenvalue, an arbitary solution of the Helmholtz equation ∆h + h = 0 on R d . This problem is motivated by the fact that, by the asymptotics for the local Weyl law, "approximate Laplace eigenfunctions" do have this approximation property on any compact Riemannian manifold. What we find is that the answer depend… Show more