In this paper we consider the development of hybrid numerical methods for the solution of hyperbolic relaxation problems with multiple scales. The main ingredients in the schemes are a suitable merging of probabilistic Monte Carlo methods in non stiff regimes with high resolution shock capturing techniques in stiff ones. The key aspect in the development of the algorithms is the choice of a suitable hybrid representation of the solution. After the introduction of the different schemes the performance of the new methods is tested in the case of Jin-Xin relaxation system and Broadwell model
A novel genuinely multi-dimensional relaxation scheme is proposed. Based on a new discrete velocity ...
A new algorithm for the numerical solution of stiff hyperbolic relaxation systems is presented. It i...
A splitting scheme is used for numerical solution of hyperbolic systems with a stiff relaxation. Hig...
In this paper we consider the development of hybrid numerical methods for the solution of hyperboli...
In these notes we present some recent results on the development of hybrid methods for hyperbolic an...
In these notes we present some recent results on the development of hybrid methods for hyperbolic an...
Scope of this PhD thesis is the development of efficient algorithms for the numerical simulation of ...
In some recent works [G. Dimarco and L. Pareschi, Comm. Math. Sci., 1 (2006), pp. 155–177; Multiscal...
In this work we consider the development of a new family of hybrid numerical methods for the soluti...
International audienceIn this paper, we construct a hierarchy of hybrid numerical methods for multi-...
International audienceWe develop a multi-dimensional hybrid discontinuous Galerkin method for multi-...
This paper describes a continuum/kinetic hybrid approach for simulating the continuum to free molecu...
In this work we present a non stationary domain decomposition algorithm for multiscale hydrodynamic-...
International audienceWe apply flux vector splitting (FVS) strategy to the implicit kinetic schemes f...
We consider the development of high-order space and time numerical methods based on implicit-explici...
A novel genuinely multi-dimensional relaxation scheme is proposed. Based on a new discrete velocity ...
A new algorithm for the numerical solution of stiff hyperbolic relaxation systems is presented. It i...
A splitting scheme is used for numerical solution of hyperbolic systems with a stiff relaxation. Hig...
In this paper we consider the development of hybrid numerical methods for the solution of hyperboli...
In these notes we present some recent results on the development of hybrid methods for hyperbolic an...
In these notes we present some recent results on the development of hybrid methods for hyperbolic an...
Scope of this PhD thesis is the development of efficient algorithms for the numerical simulation of ...
In some recent works [G. Dimarco and L. Pareschi, Comm. Math. Sci., 1 (2006), pp. 155–177; Multiscal...
In this work we consider the development of a new family of hybrid numerical methods for the soluti...
International audienceIn this paper, we construct a hierarchy of hybrid numerical methods for multi-...
International audienceWe develop a multi-dimensional hybrid discontinuous Galerkin method for multi-...
This paper describes a continuum/kinetic hybrid approach for simulating the continuum to free molecu...
In this work we present a non stationary domain decomposition algorithm for multiscale hydrodynamic-...
International audienceWe apply flux vector splitting (FVS) strategy to the implicit kinetic schemes f...
We consider the development of high-order space and time numerical methods based on implicit-explici...
A novel genuinely multi-dimensional relaxation scheme is proposed. Based on a new discrete velocity ...
A new algorithm for the numerical solution of stiff hyperbolic relaxation systems is presented. It i...
A splitting scheme is used for numerical solution of hyperbolic systems with a stiff relaxation. Hig...