FLORENTIN BENJAMIN

Keywords

Spectral geometry,inverse problems,Steklov spectrum,Dirichlet-to-Neumann map,wave invariants,boundary determination

Abstract

This work is part of the long tradition of spectral inverse problems, which can be summed up in Kac's celebrated question from the 1960s, regarding the spectrum of the Laplacian: Can one hear the shape of a drum?. Here, we address the analogous problem for the Dirichlet-Neumann map (DN map) or Steklov operator: to what extent can the geometry of a compact Riemannian manifold with boundary, or a coefficient of a problem with boundary conditions (such as an electric or magnetic potential), be uniquely determined from the spectrum of this operator ?