Regularized Potentials of Schr\"odinger Operators and a Local Landscape Function

Abstract

We study localization properties of low-lying eigenfunctions (- +V) φ = λ φ in~ for rapidly varying potentials V in bounded domains ⊂ Rd. Filoche & Mayboroda introduced the landscape function (- + V)u=1 and showed that the function u has remarkable properties: localized eigenfunctions prefer to localize in the local maxima of u. Arnold, David, Filoche, Jerison \& Mayboroda showed that 1/u arises naturally as the potential in a related equation. Motivated by these questions, we introduce a one-parameter family of regularized potentials Vt that arise from convolving V with the radial kernel Vt(x) = V * ( 1t ∫0t ( - \|·\|2/ (4s) )(4 π s )d/2 ds ). We prove that for eigenfunctions (- +V) φ = λ φ this regularization Vt is, in a precise sense, the canonical effective potential on small scales. The landscape function u respects the same type of regularization. This allows allows us to derive landscape-type functions out of solutions of the equation (- + V)u = f for a general right-hand side f: → R>0.