Semiclassical limits of eigenfunctions on flat n-dimensional tori

Abstract

We provide a proof of the conjecture formulated in Jak97,JNT01 which states that on a n-dimensional flat torus n, the Fourier transform of squares of the eigenfunctions |φλ|2 of the Laplacian have uniform ln bounds that do not depend on the eigenvalue λ. The proof is a generalization of the argument by Jakobson, et al. for the lower dimensional cases. These results imply uniform bounds for semiclassical limits on n+2. We also prove a geometric lemma that bounds the number of codimension-one simplices which satisfy a certain restriction on an n-dimensional sphere Sn(λ) of radius λ and use it in the proof.