Lp Boundedness of the Scattering Wave Operators of Schroedinger Dynamics with Time-dependent Potentials and applications

Abstract

This paper establishes the Lp boundedness of wave operators for linear Schr\"odinger equations in R3 with time-dependent potentials. The approach to the proof is based on new cancellation lemmas. As a typical application based on this method, combined with Strichartz estimates is the existence and scattering for nonlinear dispersive equations. For example, we prove global existence and uniform boundedness in L∞, for a class of Hartree nonlinear Schr\"odinger equations in L2(R3), allowing the presence of solitons. We also prove the existence of free channel wave operators in Lp(Rn) for p>pc(n), with pc(3)=6.