Non-random perturbations of the Anderson Hamiltonian
Abstract
The Anderson Hamiltonian H0=-+V(x,ω) is considered, where V is a random potential of Bernoulli type. The operator H0 is perturbed by a non-random, continuous potential -w(x) ≤ 0, decaying at infinity. It will be shown that the borderline between finitely, and infinitely many negative eigenvalues of the perturbed operator, is achieved with a decay of the potential -w(x) as O(-2/d |x|).
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