Abstract (EN)

This thesis deals with numerical simulation issues, and concerns the study of time- harmonic electromagnetic scattering problems. We are mainly interested in integral re-presentation methods and in simulations that need the use of a direct solver. Their range of application is rapidly limited with classical approximation schemes, since they require a large number of unknowns to achieve accurate results. To overcome this problem, we intend to adapt the spectral finite element method to electromagnetic integral equa-tions, then to the hybrid boundary element - finite element method (BE-FEM). The main advantage of our approach is that the Hdivconforming property (Hdiv-Hcurl within the BE-FEM) is enforced, meanwhile it can be interpreted as a point-based scheme. This al-lows a significant increase of the approximation order, that yields to a dramatical decrease of both the number of unknowns and computational costs, while ensuring the accuracy of the result. Another originality of our study lies in the development of high-order ani-sotropic hexahedral elements, to deal with conducting scatterers coated with a thin layer of material. Key words :computational electromagnetics, Maxwell equations, integral equations, hybrid boundary element - finite element method, method of moments, spectral finite element method, high-order approximation.