Weakly localized states of one dimensional Schrodinger equations have localized energy
Abstract
We study the asymptotics of the Schr\"odinger equation with time-dependent potential in dimension one. Assuming that the potential decays sufficiently rapidly as |x| ∞, we prove that the solution can be written as the sum of a free wave e-it u+ and a weakly bound component uwb(t). Moreover, we show that the weakly bound part decomposes as uwb(t) = uloc(t) + oH1(1), where ∂x uloc(t) is localized near the origin uniformly in time. Since decay conditions on the potential do not preclude resonances unless d ≥ 5, our results can be seen as a natural extension of [Terence Tao. Dynamics of Partial Differential Equations, 5(2), 2008] and [Avy Soffer, Xiaoxu Wu. arXiv:2304.04245] to the lower-dimensional case.
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