On the Well-posedness of Magnetic Schr\"odinger Equations with Unbounded Potentials
Abstract
We consider magnetic Schr\"odinger equations with sublinear magnetic potentials and subquadratic electric potentials on Rd, as well as generalizations thereof. We obtain new results on the global well-posedness of the Cauchy problem with initial data in magnetic modulation spaces MpA(Rd). Our results are achieved by approximating the solution in phase space using the magnetic Hamiltonian flow. This method includes the potentials as part of the generalized Schr\"odinger operator instead of treating them as perturbations, and thereby allows us to deal with unbounded potentials. For A 0, the space MpA(Rd) reduces to the usual modulation space Mp(Rd), for which relevant known results for the usual Schr\"odinger equation can be recovered.
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