In this work we investigate the stability and approximation properties of the cell-vertex finite volume method applied to an elliptic partial differential equation discretized on quadrilateral or cuboid meshes in two or three dimensions respectively. The Helmholtz type equation of interest originates from the projection step in the semi-discretisation of a second order semi-implicit finite volume scheme, which is capable of resolving the pseudo-incompressible and compressible regime of the Euler equations in a unified numerical framework. Consequently, we investigate the mixed saddle point problem determined by the pseudo-incompressible divergence constraint and include the source terms responsible for compressible effects. We ...
International audienceWe present in this paper a finite-volume based flexible Multi-Point Flux Appro...
This paper initiates a study of finite volume methods for linear first-order elliptic systems by per...
We present a finite volume method for transport, diffusion and reaction problems on evolving hyper-s...
International audienceThis work is devoted to the design of multi-dimensional finite volume schemes ...
This work proposes a novel finite volume paradigm, ie, the face‐centred finite volume (FCFV) method....
Abstract. We study the consistency and convergence of the cell-centered Finite Volume (FV) external ...
We show convergence of a cell-centered finite volume discretization for linear elasticity. The discr...
AbstractIn this paper we propose a simple, robust and accurate nonlinear a posteriori stabilization ...
International audienceDiscrete Duality Finite Volume (DDFV) schemes have recently been developed in ...
This paper is concerned with the finite volume approximation of the p-laplacian equation with homoge...
International audienceWe point out a simple 2D formula to reconstruct the discrete gradient on a pol...
A vertex-based finite volume (FV) method is presented for the computational solution of quasi-static...
AbstractWe propose a unified treatment of internal and boundary vertex least-squares reconstructions...
In this article, we consider the nodal flux extension of classical Eulerian edge flux schemes for li...
AbstractThe coupling of cell-centered finite volume method with primal discontinuous Galerkin method...
International audienceWe present in this paper a finite-volume based flexible Multi-Point Flux Appro...
This paper initiates a study of finite volume methods for linear first-order elliptic systems by per...
We present a finite volume method for transport, diffusion and reaction problems on evolving hyper-s...
International audienceThis work is devoted to the design of multi-dimensional finite volume schemes ...
This work proposes a novel finite volume paradigm, ie, the face‐centred finite volume (FCFV) method....
Abstract. We study the consistency and convergence of the cell-centered Finite Volume (FV) external ...
We show convergence of a cell-centered finite volume discretization for linear elasticity. The discr...
AbstractIn this paper we propose a simple, robust and accurate nonlinear a posteriori stabilization ...
International audienceDiscrete Duality Finite Volume (DDFV) schemes have recently been developed in ...
This paper is concerned with the finite volume approximation of the p-laplacian equation with homoge...
International audienceWe point out a simple 2D formula to reconstruct the discrete gradient on a pol...
A vertex-based finite volume (FV) method is presented for the computational solution of quasi-static...
AbstractWe propose a unified treatment of internal and boundary vertex least-squares reconstructions...
In this article, we consider the nodal flux extension of classical Eulerian edge flux schemes for li...
AbstractThe coupling of cell-centered finite volume method with primal discontinuous Galerkin method...
International audienceWe present in this paper a finite-volume based flexible Multi-Point Flux Appro...
This paper initiates a study of finite volume methods for linear first-order elliptic systems by per...
We present a finite volume method for transport, diffusion and reaction problems on evolving hyper-s...