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Recovery of time-dependent coefficients from boundary data for hyperbolic equations

Ali Feizmohammadi, Joonas Ilmavirta, Yavar Kian, Lauri Oksanen

2021Journal of Spectral Theory14 citationsDOIOpen Access PDF

Abstract

We study uniqueness of the recovery of a time-dependent magnetic vector valued potential and an electric scalar-valued potential on a Riemannian manifold from the knowledge of the Dirichlet-to-Neumann map of a hyperbolic equation. The Cauchy data is observed on time-like parts of the space-time boundary and uniqueness is proved up to the natural gauge for the problem. The proof is based on Gaussian beams and inversion of the light ray transform on Lorentzian manifolds under the assumptions that the Lorentzian manifold is a product of a Riemannian manifold with a time interval and that the geodesic ray transform is invertible on the Riemannian manifold.

Topics & Concepts

MathematicsMathematical analysisUniquenessRiemannian manifoldPseudo-Riemannian manifoldGeodesicManifold (fluid mechanics)Hyperbolic spaceStatistical manifoldDirichlet boundary conditionHyperbolic manifoldPure mathematicsBoundary value problemInformation geometryScalar curvatureHyperbolic functionGeometryCurvatureEngineeringMechanical engineeringNumerical methods in inverse problemsThermoelastic and Magnetoelastic PhenomenaAdvanced Mathematical Modeling in Engineering
Recovery of time-dependent coefficients from boundary data for hyperbolic equations | Litcius