Add to ORKGIn this work, merging ideas from compatible discretisations and polyhedral methods, we construct novel fully discrete polynomial de Rham sequences of arbitrary degree on polygons and polyhedra. The spaces and operators that appear in these sequences are directly amenable to computer implementation. Besides proving exactness, we show that the usual sequence of Finite Element spaces forms, through appropriate interpolation operators, a commutative diagram with our sequence, which ensures suitable approximation properties. A discussion on reconstructions of potentials and discrete $L^2$-products completes the exposition
We analyze constrained and unconstrained minimization problems on patches of tetrahedra sharing a co...
AbstractWe prove that the hp finite elements for H(curl) spaces, introduced in [1], fit into a gener...
We study low-order reconstruction operators on polyhedral meshes, providing a unified framework for ...
International audienceIn this work, merging ideas from compatible discretisations and polyhedral met...
International audienceIn this work, merging ideas from compatible discretisations and polyhedral met...
In this work we prove that, for a general polyhedral domain of $\Real^3$, the cohomology spaces of t...
This thesis presents a new class of spatial discretization schemes on polyhedral meshes, called Comp...
This thesis presents a new class of spatial discretization schemes on polyhedral meshes, called Comp...
International audienceIn this work, we develop a discretisation method for the mixed formulation of ...
In this paper we present an arbitrary-order fully discrete Stokes complex on general polyhedral mesh...
In this work, following the discrete de Rham (DDR) approach, we develop a discrete counterpart of a ...
This paper proposes new finite element spaces that can be constructed for agglomerates of standard e...
Cette thèse présente une nouvelle classe de schémas de discrétisation spatiale sur maillages polyédr...
International audienceCompatible schemes localize degrees of freedom according to the physical natur...
We provide a novel framework to compute a discrete vector potential of a given discrete vector field...
We analyze constrained and unconstrained minimization problems on patches of tetrahedra sharing a co...
AbstractWe prove that the hp finite elements for H(curl) spaces, introduced in [1], fit into a gener...
We study low-order reconstruction operators on polyhedral meshes, providing a unified framework for ...
International audienceIn this work, merging ideas from compatible discretisations and polyhedral met...
International audienceIn this work, merging ideas from compatible discretisations and polyhedral met...
In this work we prove that, for a general polyhedral domain of $\Real^3$, the cohomology spaces of t...
This thesis presents a new class of spatial discretization schemes on polyhedral meshes, called Comp...
This thesis presents a new class of spatial discretization schemes on polyhedral meshes, called Comp...
International audienceIn this work, we develop a discretisation method for the mixed formulation of ...
In this paper we present an arbitrary-order fully discrete Stokes complex on general polyhedral mesh...
In this work, following the discrete de Rham (DDR) approach, we develop a discrete counterpart of a ...
This paper proposes new finite element spaces that can be constructed for agglomerates of standard e...
Cette thèse présente une nouvelle classe de schémas de discrétisation spatiale sur maillages polyédr...
International audienceCompatible schemes localize degrees of freedom according to the physical natur...
We provide a novel framework to compute a discrete vector potential of a given discrete vector field...
We analyze constrained and unconstrained minimization problems on patches of tetrahedra sharing a co...
AbstractWe prove that the hp finite elements for H(curl) spaces, introduced in [1], fit into a gener...
We study low-order reconstruction operators on polyhedral meshes, providing a unified framework for ...