Root System of a Perturbation of a Selfadjoint Operator with Discrete Spectrum
Abstract
We analyze the perturbations T+B of a selfadjoint operator T in a Hilbert space H with discrete spectrum \tk \, T φk = tk φk, as an extension of our constructions in arXiv: 0912.2722 where T was a harmonic oscillator operator. In particular, if tk+1-tk ≥ c kα - 1, α > 1/2 and \| B φk \| = o(kα - 1) then the system of root vectors of T+B, eventually eigenvectors of geometric multiplicity 1, is an unconditional basis in H.
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