On the reducibility of the 1d quantum harmonic oscillator with a quasi-periodic bounded potential
Abstract
Using the decay along the diagonal of the matrix representing the perturbation with respect to the Hermite basis, we prove a reducibility result in L2(R) for the one-dimensional quantum harmonic oscillator perturbed by time quasi-periodic potential, via a KAM iteration. The potential is only bounded (no decay at infinity is required) and its derivative with respect to the spatial variable x is allowed to grow at most like |x|δ when x goes to infinity, where the power δ<1 is arbitrary.
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