Scale-free unique continuation estimates and applications to random Schr\"odinger operators

Abstract

We prove a unique continuation principle or uncertainty relation valid for Schr\"odinger operator eigenfunctions, or more generally solutions of a Schr\"odinger inequality, on cubes of side L∈ 2+1. It establishes an equi-distribution property of the eigenfunction over the box: the total L2-mass in the box of side L is estimated from above by a constant times the sum of the L2-masses on small balls of a fixed radius δ>0 evenly distributed throughout the box. The dependence of the constant on the various parameters entering the problem is given explicitly. Most importantly, there is no L-dependence. This result has important consequences for the perturbation theory of eigenvalues of Schr\"odinger operators, in particular random ones. For so-called Delone-Anderson models we deduce Wegner estimates, a lower bound for the shift of the spectral minimum, and an uncertainty relation for spectral projectors.