Lp boundedness of the wave operator for the one dimensional Schroedinger operator

Abstract

Given a one dimensional perturbed Schroedinger operator H=-(d/dx)2+V(x) we consider the associated wave operators W+, W- defined as the strong L2 limits as s-> ∞ of the operators eisH e-isH0 We prove that the wave operators are bounded operators on Lp for all 1<p<∞, provided (1+|x|)2 V(x) is integrable, or else (1+|x|)V(x) is integrable and 0 is not a resonance. For p=∞ we obtain an estimate in terms of the Hilbert transform. Some applications to dispersive estimates for equations with variable rough coefficients are given.

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