Abstract EN:

In this thesis, four Partial Differential Equations of different nature are studied, numerically or/and theoretically. The first part deals with non-conservative hyperbolic systems in one space dimension. In the case of non-conservative hyperbolic systems, several definitions of shock waves exist in the literature, in this paper, we propose and study a new, very simple one in the case of genuinely non-linear fields. The second part is concerned with the Harmonic Map flow. We build solutions to the harmonic map flow from the unit disk into the unit sphere which have constant degree, in a co-rotational symmetric frame. First we prove the existence of such solutions, using a time semi-discrete scheme then we compute numerically these solutions by a moving-mesh method which allows us to deal with the singularities. The third part deals with the initial-and-boundary value problem for the Kadomtse-Petviashvili II equation posed on a strip with a Dirichlet left boundary condition and two kinds of conditions on the right boundary. Moreover we treat the case of the half plane and we show a result of convergence. In the last part, we investigate by numerical means a conjecture proposed by Guy David about the existence of a new Global Minimizer for the Mumford-Shah Functional in R^3. We are led to study a spectral problem for the Laplace operator with Neumann boundary conditions on a two dimensional subdomain of the sphere S^2 with reentrant corners. In particular, we have to compute the first eigenvector of this operator and accurate approximations of the singular coefficients of this eigenvector at each corner. For that we use the Singular Complement Method.