Sturm–Liouville operators in the half axis with local perturbations

Abstract: We give conditions which imply equivalence of the Lebesgue measure with respect to a measure μ generated as an average of spectral measures corresponding to Sturm-Liouville operators in the half axis. We apply this to prove that some spectral properties of these operators hold for large sets of boundary conditions if and only if they hold for large sets of positive local perturbations.

Generalized Kotani’s trick for unitary operators

Generalized Kotani’s trick for unitary operators

Spectral averaging techniques for Jacobi matrices

Sturm–Liouville operators in the half axis with shifted potentials