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arxiv 2101.02186 v2 pith:WDKRLMER submitted 2021-01-06 math.NA cs.NAmath.OC

Computability of magnetic Schr\"odinger and Hartree equations on unbounded domains

classification math.NA cs.NAmath.OC
keywords computabilitycomputedcontrolequationsestimateshartreeinitialmagnetic
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We study the computability of global solutions to linear Schr\"odinger equations with magnetic fields and the Hartree equation on $\mathbb R^3$. We show that the solution can always be globally computed with error control on the entire space if there exist a priori decay estimates in generalized Sobolev norms on the initial state. Using weighted Sobolev norm estimates, we show that the solution can be computed with uniform computational runtime with respect to initial states and potentials. We finally study applications in optimal control theory and provide numerical examples.

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