2022 Help me understand this report
Localization Properties of High-Energy Eigenfunctions on Flat Tori
Abstract: We consider the question of when the Laplace eigenfunctions on an arbitrary flat torus ${\mathbb {T}}_\Gamma :={\mathbb {R}}^d/\Gamma $ are flexible enough to approximate, over the natural length scale of order $1/\sqrt \lambda $ where $\lambda \gg 1$ is the eigenvalue, an arbitary solution of the Helmholtz equation $\Delta h + h=0$ on ${\mathbb {R}}^d$. This problem is motivated by the fact that, by the asymptotics for the local Weyl law, “approximate Laplace eigenfunctions” do have this approximation propert…
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