Abstract EN:

This thesis consists of three parts. The purpose, of the first part, is to define a general geometry of the analytic wavefront set, in order to study the microlocal singularity of solutions to the Schrödinger equation with high power. In the second part, we study, in dimension n> or =3, the inverse problem of determining the potential q of the Schrödinger equation from infinity measurements on any open subset of the boundary. Provided that q is known in a neighborhood of the boundary, we prove the logarithmic stability estimate. The last part is devoted to the study of a coupled system consisting in a wave and heat equations coupled through transmission condition along a steady interface. This system is a linearized model for fluid-structure interaction introduced by Rauch, Zhang and Zuazua for a simple transmission condition and by Zhang and Zuazua for a natural transmission condition. Using an abstract Theorem of Burq and a new Carleman estimate shown near the interface, we complete the results obtained by Zhang and Zuazua and by Duyckaerts. We show, without any geometric restriction, a logarithmic decay result.