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Article Dans Une Revue Publications of the Research Institute for Mathematical Sciences Année : 2018

An inverse problem for the magnetic Schrödinger equation in infinite cylindrical domains

Résumé

We study the inverse problem of determining the magnetic field and the electric potential entering the Schrödinger equation in an infinite 3D cylindrical domain, by Dirichlet-to-Neumann map. The cylindrical domain we consider is a closed waveguide in the sense that the cross section is a bounded domain of the plane. We prove that the knowledge of the Dirichlet-to-Neumann map determines uniquely, and even Hölder-stably, the magnetic field induced by the magnetic potential and the electric potential. Moreover, if the maximal strength of both the magnetic field and the electric potential, is attained in a fixed bounded subset of the domain, we extend the above results by taking finitely extended boundary observations of the solution, only.
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Dates et versions

hal-01319127 , version 1 (20-05-2016)

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M Bellassoued, Y Kian, Eric Soccorsi. An inverse problem for the magnetic Schrödinger equation in infinite cylindrical domains. Publications of the Research Institute for Mathematical Sciences, 2018, 54 (4), pp.679-728. ⟨10.4171/PRIMS/54-4-1⟩. ⟨hal-01319127⟩
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