Localization of Quantum States and Landscape Functions

Abstract

Eigenfunctions in inhomogeneous media can have strong localization properties. Filoche \& Mayboroda showed that the function u solving (- + V)u = 1 controls the behavior of eigenfunctions (- + V)φ = λφ via the inequality |φ(x)| ≤ λ u(x) \|φ\|L∞. This inequality has proven to be remarkably effective in predicting localization and recently Arnold, David, Jerison, Mayboroda \& Filoche connected 1/u to decay properties of eigenfunctions. We aim to clarify properties of the landscape: the main ingredient is a localized variation estimate obtained from writing φ(x) as an average over Brownian motion ω(·) in started in x φ(x) = Ex(φ(ω(t)) eλ t-∫0tV(ω(z))dz ). This variation estimate will guarantee that φ has to change at least by a factor of 2 in a small ball, which implicitly creates a landscape whose relationship with 1/u we discuss.