It is well-known that the Fourier-Galerkin spectral method has been a popular approach for the numerical approximation of the deterministic Boltzmann equation with spectral accuracy rigorously proved. In this paper, we will show that such a spectral convergence of the Fourier-Galerkin spectral method also holds for the Boltzmann equation with uncertainties arising from both collision kernel and initial condition. Our proof is based on newly-established spaces and norms that are carefully designed and take the velocity variable and random variables with their high regularities into account altogether. For future studies, this theoretical result will provide a solid foundation for further showing the convergence of the full-discretized system...
We present new results building on the conservative deterministic spectral method for the space homo...
In this paper we study the numerical passage from the spatially homogeneous Boltzmann equation witho...
A deterministic method is proposed for solving the Boltzmann equation. The method employs a Galerkin...
In this paper we show that the use of spectral-Galerkin methods for the approximation of the Boltzma...
41 pagesInternational audienceThe development of accurate and fast algorithms for the Boltzmann coll...
International audienceSpectral methods, thanks to the high accuracy and the possibility of using fas...
The Boltzmann equation offers a mesoscopic description of rarefied gases and is a typical represent...
The Boltzmann equation, an integro-differential equation for the molecular distribution function in ...
In this paper the nonlinear multi-species Boltzmann equation with random uncertainty coming from the...
The Boltzmann equation describes the dynamics of rarefied gas flows, but the multidimensional nature...
The Boltzmann equation describes the evolution of the phase-space probability distribution of classi...
International audienceIn this paper we present a fully deterministic method for the numerical soluti...
We present new results building on the conservative deterministic spectral method for the space inho...
International audienceIn this paper we present several numerical results performed with a fully dete...
We present new results building on the conservative deterministic spectral method for the space homo...
In this paper we study the numerical passage from the spatially homogeneous Boltzmann equation witho...
A deterministic method is proposed for solving the Boltzmann equation. The method employs a Galerkin...
In this paper we show that the use of spectral-Galerkin methods for the approximation of the Boltzma...
41 pagesInternational audienceThe development of accurate and fast algorithms for the Boltzmann coll...
International audienceSpectral methods, thanks to the high accuracy and the possibility of using fas...
The Boltzmann equation offers a mesoscopic description of rarefied gases and is a typical represent...
The Boltzmann equation, an integro-differential equation for the molecular distribution function in ...
In this paper the nonlinear multi-species Boltzmann equation with random uncertainty coming from the...
The Boltzmann equation describes the dynamics of rarefied gas flows, but the multidimensional nature...
The Boltzmann equation describes the evolution of the phase-space probability distribution of classi...
International audienceIn this paper we present a fully deterministic method for the numerical soluti...
We present new results building on the conservative deterministic spectral method for the space inho...
International audienceIn this paper we present several numerical results performed with a fully dete...
We present new results building on the conservative deterministic spectral method for the space homo...
In this paper we study the numerical passage from the spatially homogeneous Boltzmann equation witho...
A deterministic method is proposed for solving the Boltzmann equation. The method employs a Galerkin...