Date/heure
28 avril 2026
10:45 - 11:45
Lieu
Salle de conférences Nancy
Oratrice ou orateur
Mihajlo CEKIC
Catégorie d'évènement Séminaire Équations aux Derivées Partielles et Applications (Nancy)
Résumé
Anisotropic Calderon’s inverse problem asks if the data given by voltage-to-current measurements on the boundary of a conducting domain can be used to uniquely determine the anisotropic conductivity in the interior of the domain. Geometric reformulated, this problem becomes: given a compact Riemannian manifold (M, g) with boundary, does the full knowledge of the Dirichlet-to-Neumann map (corresponding to the metric Laplacian -\Delta_g) determine the Riemannian metric g up to isometries fixing the boundary? In this talk, I will explain a positive answer at high frequencies, that is we will show that the D-t-N map of -\Delta_g – \lambda^2 for \lambda large enough determines the lens data, i.e. the exit points and directions of incoming geodesics (scattering data), together with travel times; under favourable geometric assumptions, this is known to determine g up to isometries. Joint work with S. Sahoo and G. Uhlmann.