In this thesis, we are interested in the construction of high-order finite elements adapted to hybrid meshes for the resolution of time-dependent and time-harmonic linear hyperbolic systems. We paid a special attention to the construction of pyramidal elements. We search optimal finite elements for three different formulations, the optimality being in the sense of the convergence in the norm of the space considered for the formulation. For H^1 and H(curl) formulations, optimal nodal and hp finite elements are constructed. The elementary matrices are evaluated with appropriate quadrature formula, and error estimates are performed to check the convergence of the constructed optimal elements. For the LDG (Local Discontinuous Galerkin) formulat...
We analyze the $hp$-version of the streamline-diffusion (SDFEM) and of the discontinuous Galerkin me...
International audienceWe build a bridge between the hybrid high-order (HHO) and the hybridizable dis...
This doctoral research endeavors to reduce the computational cost involved in the solution of initi...
In this thesis, we are interested in the construction of high-order finite elements adapted to hybri...
Dans cette thèse, nous nous intéressons à la construction d'éléments finis d'ordre élevé adaptés aux...
International audienceEdge elements are a popular method to solve Maxwell's equations especially in ...
Classical facet elements do not provide an optimal rate of convergence of the numerical solution tow...
International audienceWe study arbitrarily high-order finite elements defined on pyramids on discont...
We provide a comprehensive study of arbitrarily high-order finite elements defined on pyramids. We p...
We construct and study a set of hierarchic basis functions for the Galerkin discretisation of the sp...
This thesis is concerned with the study of a Discontinuous Galerkin Time-Domain method (DGTD), for t...
In this thesis, we are interested in the devising of Hybrid High-Order (HHO) methods for nonlinear s...
International audienceHybrid High-Order (HHO) methods are new generation numerical methods for model...
To solve wave equations in heterogeneous media with finite elements with a reasonable numerical cost...
We consider a second-order, elliptic partial differential equation (PDE) discretized by the Hybrid H...
We analyze the $hp$-version of the streamline-diffusion (SDFEM) and of the discontinuous Galerkin me...
International audienceWe build a bridge between the hybrid high-order (HHO) and the hybridizable dis...
This doctoral research endeavors to reduce the computational cost involved in the solution of initi...
In this thesis, we are interested in the construction of high-order finite elements adapted to hybri...
Dans cette thèse, nous nous intéressons à la construction d'éléments finis d'ordre élevé adaptés aux...
International audienceEdge elements are a popular method to solve Maxwell's equations especially in ...
Classical facet elements do not provide an optimal rate of convergence of the numerical solution tow...
International audienceWe study arbitrarily high-order finite elements defined on pyramids on discont...
We provide a comprehensive study of arbitrarily high-order finite elements defined on pyramids. We p...
We construct and study a set of hierarchic basis functions for the Galerkin discretisation of the sp...
This thesis is concerned with the study of a Discontinuous Galerkin Time-Domain method (DGTD), for t...
In this thesis, we are interested in the devising of Hybrid High-Order (HHO) methods for nonlinear s...
International audienceHybrid High-Order (HHO) methods are new generation numerical methods for model...
To solve wave equations in heterogeneous media with finite elements with a reasonable numerical cost...
We consider a second-order, elliptic partial differential equation (PDE) discretized by the Hybrid H...
We analyze the $hp$-version of the streamline-diffusion (SDFEM) and of the discontinuous Galerkin me...
International audienceWe build a bridge between the hybrid high-order (HHO) and the hybridizable dis...
This doctoral research endeavors to reduce the computational cost involved in the solution of initi...