Fiabilité et optimisation des calculs obtenus par des formulations intégrales en propagation d'ondes

Marc Bakry 1, 2
1 POEMS - Propagation des Ondes : Étude Mathématique et Simulation
Inria Saclay - Ile de France, UMA - Unité de Mathématiques Appliquées, CNRS - Centre National de la Recherche Scientifique : UMR7231
Abstract : The aim of this work is to participate to the popularization of methods for the resolution of wave propagation problems based on integral equations formulations by developping a posteriori error estimates in the context of autoadaptive mesh refinement strategies. The development of such estimates is difficult because of the non-locality of the norms associated to the Sobolev spaces and of the involved integral operators. Estimates from the literature are extended in the case of the propagation of an acoustic wave. The proofs of quasi-optimal convergence of the autoadaptive algorithms are established. We then introduce a new approach with respect to the literature which is based on a new norm-localization technique based on the use of a well-chosen Λ operator and not on inverse inequalities as it was the case previously.We then establish new a posteriori error estimates which are reliable, efficient, local and asymptotically exact with respect to the Galerkin norm of the error. We give a method for the construction of such estimates. Numerical applications on 2D and 3D geometries confirm the asymptotic exactness and the optimality of the autoadaptive algorithm.These estimates are extended in the case of the propagation of an electromagnetic wave. More precisely, we are interested in the EFIE. We suggest generalization of the estimates of the literature. A proof for quasi-optimal convergence is given for an estimate based on a localization of the norm of the residual. The principle of Λ is used to construct the first reliable, efficient, local error estimate for this equation. We give a second forme which is eventually theoretically asymptotically exact.
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Marc Bakry. Fiabilité et optimisation des calculs obtenus par des formulations intégrales en propagation d'ondes. Physique mathématique [math-ph]. Université Paris-Saclay, 2016. Français. ⟨NNT : 2016SACLY013⟩. ⟨tel-01422039⟩

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