International audienceIn this work we develop arbitrary-order Discontinuous Skeletal Gradient Discretisations (DSGD) on general polytopal meshes. Discontinuous Skeletal refers to the fact that the globally coupled unknowns are broken polynomial on the mesh skeleton. The key ingredient is a high-order gradient reconstruction composed of two terms: (i) a consistent contribution obtained mimicking an integration by parts formula inside each element and (ii) a stabilising term for which sufficient design conditions are provided. An example of stabilisation that satisfies the design conditions is proposed based on a local lifting of high-order residuals on a Raviart–Thomas–Nédélec subspace. We prove that the novel DSGDs satisfy coercivity, consi...
In this article we design and analyze a class of two-level non- overlapping additive Schwarz precond...
Recovered Finite Element Methods (R-FEM) have been recently introduced in Georgoulis and Pryer [Comp...
In this paper we present efficient quadrature rules for the numerical approximation of integrals of ...
We propose in this work a unified formulation of mixed and primal discretization methods on polyhedr...
International audienceDiscontinuous Skeletal methods approximate the solution of boundary-value prob...
International audienceWe include in the Gradient Discretisation Method (GDM) framework two numerical...
In this article we consider the application of discontinuous Galerkin finite element methods, define...
This paper presents a numerical method to obtain high order of convergence for electrostatic problem...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...
International audienceWe show that a version of the Discontinuous Galerkin Method (DGM) can be inclu...
This thesis is concerned with the analysis and implementation of the hp-version interior penalty dis...
International audienceIn this work we present a generic framework for non-conforming finite elements...
International audienceWe develop an arbitrary-order primal method for diffusion problems on general ...
In this article we design and analyze a class of two-level non- overlapping additive Schwarz precond...
Recovered Finite Element Methods (R-FEM) have been recently introduced in Georgoulis and Pryer [Comp...
In this paper we present efficient quadrature rules for the numerical approximation of integrals of ...
We propose in this work a unified formulation of mixed and primal discretization methods on polyhedr...
International audienceDiscontinuous Skeletal methods approximate the solution of boundary-value prob...
International audienceWe include in the Gradient Discretisation Method (GDM) framework two numerical...
In this article we consider the application of discontinuous Galerkin finite element methods, define...
This paper presents a numerical method to obtain high order of convergence for electrostatic problem...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...
International audienceWe show that a version of the Discontinuous Galerkin Method (DGM) can be inclu...
This thesis is concerned with the analysis and implementation of the hp-version interior penalty dis...
International audienceIn this work we present a generic framework for non-conforming finite elements...
International audienceWe develop an arbitrary-order primal method for diffusion problems on general ...
In this article we design and analyze a class of two-level non- overlapping additive Schwarz precond...
Recovered Finite Element Methods (R-FEM) have been recently introduced in Georgoulis and Pryer [Comp...
In this paper we present efficient quadrature rules for the numerical approximation of integrals of ...