A theorem on the multiplicity of the singular spectrum of a general Anderson-type Hamiltonian

Abstract: In this work, we study the multiplicity of the singular spectrum for operators of the form A ! D A C P n ! n C n on a separable Hilbert space H, where A is a self-adjoint operator and ¹C n º n is a countable collection of non-negative finite-rank operators. When ¹! n º n are independent real random variables with absolutely continuous distributions, we show that the multiplicity of the singular spectrum is almost surely bounded above by the maximum algebraic multiplicity of the eigenvalues of the operator p C … Show more