Eigenvalue fluctuations for lattice Anderson Hamiltonians

Abstract

We study the statistics of Dirichlet eigenvalues of the random Schr\"odinger operator -ε-2(d)+(ε)(x), with (d) the discrete Laplacian on Zd and (ε)(x) uniformly bounded independent random variables, on sets of the form Dε:=\x∈ Zd xε∈ D\ for D⊂ Rd bounded, open and with a smooth boundary. If E(ε)(x)=U(xε) holds for some bounded and continuous U D R, we show that, as ε0, the k-th eigenvalue converges to the k-th Dirichlet eigenvalue of the homogenized operator -+U(x), where is the continuum Dirichlet Laplacian on D. Assuming further that Var((ε)(x))=V(xε) for some positive and continuous V D R, we establish a multivariate central limit theorem for simple eigenvalues centered by their expectation. The limiting covariance for a given pair of simple eigenvalues is expressed as an integral of V against the product of squares of the corresponding eigenfunctions of -+U(x).