The main objective of this thesis concerns the study, design and numerical implementation of finite volume schemes based on the so-Called Godunov-Type solvers for hyperbolic systems of nonlinear conservation laws, with special attention given to the Euler equations and ideal MHD equations. First, we derive a simple and genuinely two-Dimensional Riemann solver for general conservation laws that can be regarded as an actual 2D generalization of the HLL approach, relying heavily on the consistency with the integral formulation and on the proper use of Rankine-Hugoniot relations to yield expressions that are simple enough to be applied in the structured and unstructured contexts. Then, a comparison between two methods aiming to numerically main...
This paper extends a class of approximate Riemann solvers devised by Harten, Lax and van Leer (HLL) ...
We describe a new Godunov algorithm for relativistic magnetohydrodynamics (RMHD) that combines a sim...
We report on our study aimed at deriving a simple method to numerically approximate the solution of ...
The main objective of this thesis concerns the study, design and numerical implementation of finite ...
L’objectif principal de cette thèse concerne l’étude, la conception et la mise en œuvre numérique de...
We design stable and high-order accurate finite volume schemes for the ideal MHD equations in multi-...
International audienceWe derive a simple method to numerically approximate the solution of the two-d...
Numerical methods for solving non-linear systems of hyperbolic conservation laws via finite volume m...
We present a general framework to design Godunov-type schemes for multidimensional ideal magnetohydr...
We are interested in the numerical resolution of hyperbolic systems of conservation laws which don&a...
In this paper, we present a new method to perform numerical simulations of astrophysical MHD flows u...
We build and analyze mathematically numerical approximations by finite volume methods of weak soluti...
International audienceAims. In this paper, we present a new method to perform numerical simulations ...
International audienceWe study the Euler equations with gravitational source terms derived from a po...
Aims. In this paper, we present a new method to perform numerical simulations of astrophysical MHD ...
This paper extends a class of approximate Riemann solvers devised by Harten, Lax and van Leer (HLL) ...
We describe a new Godunov algorithm for relativistic magnetohydrodynamics (RMHD) that combines a sim...
We report on our study aimed at deriving a simple method to numerically approximate the solution of ...
The main objective of this thesis concerns the study, design and numerical implementation of finite ...
L’objectif principal de cette thèse concerne l’étude, la conception et la mise en œuvre numérique de...
We design stable and high-order accurate finite volume schemes for the ideal MHD equations in multi-...
International audienceWe derive a simple method to numerically approximate the solution of the two-d...
Numerical methods for solving non-linear systems of hyperbolic conservation laws via finite volume m...
We present a general framework to design Godunov-type schemes for multidimensional ideal magnetohydr...
We are interested in the numerical resolution of hyperbolic systems of conservation laws which don&a...
In this paper, we present a new method to perform numerical simulations of astrophysical MHD flows u...
We build and analyze mathematically numerical approximations by finite volume methods of weak soluti...
International audienceAims. In this paper, we present a new method to perform numerical simulations ...
International audienceWe study the Euler equations with gravitational source terms derived from a po...
Aims. In this paper, we present a new method to perform numerical simulations of astrophysical MHD ...
This paper extends a class of approximate Riemann solvers devised by Harten, Lax and van Leer (HLL) ...
We describe a new Godunov algorithm for relativistic magnetohydrodynamics (RMHD) that combines a sim...
We report on our study aimed at deriving a simple method to numerically approximate the solution of ...