We prove that the multidimensional Schr\"odinger equation is exactly
controllable in infinite time near any point which is a finite linear
combination of eigenfunctions of the Schr\"odinger operator. We prove that,
generically with respect to the potential, the linearized system is
controllable in infinite time. Applying the inverse mapping theorem, we prove
the controllability of the nonlinear system

Nersesyan, Vahagn

Nersisyan, Hayk

English

arXiv

AbstractIn this paper, we study the problem of controllability of Schrödinger equation. We prove that the system is exactly controllable in infinite time to any position. The proof is based on an inverse mapping theorem for multivalued functions. We show also that the system is not exactly controllable in finite time in lower Sobolev spaces

Elsevier - Publisher Connector 

Global exact controllability in infinite time of Schrödinger equation 

International audienceWe prove that the multidimensional Schrödinger equation is exactly controllable in infinite time near any point which is a finite linear combination of eigenfunctions of the Schrödinger operator. We prove that, generically with respect to the potential, the linearized system is controllable in infinite time. Applying the inverse mapping theorem, we prove the controllability of the nonlinear system

HAL UVSQ

Global exact controllability in infinite time of Schrödinger equation: multidimensional case

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Global exact controllability in infinite time of Schr\"odinger equation: multidimensional case

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Elsevier - Publisher Connector

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Elsevier - Publisher Connector