Fast localization of eigenfunctions via smoothed potentials

Abstract

We study the problem of predicting highly localized low-lying eigenfunctions (- +V) φ = λ φ in bounded domains ⊂ Rd for rapidly varying potentials V. Filoche & Mayboroda introduced the function 1/u, where (- + V)u=1, as a suitable regularization of V from whose minima one can predict the location of eigenfunctions with high accuracy. We proposed a fast method that produces a landscapes that is exceedingly similar, can be used for the same purposes and can be computed very efficiently: the computation time on an n × n grid, for example, is merely O(n2 n), the cost of two FFTs.