Discrete-velocity approximations represent a popular way for computing the Boltzmann collision operator. The direct numerical evaluation of such methods involve a prohibitive cost, typically O(N2d + 1) where d is the dimension of the velocity space. In this paper, following the ideas introduced in [C. Mouhot and L. Pareschi, C. R. Acad. Sci. Paris Sér. I Math. 339 (2004) 71–76, C. Mouhot and L. Pareschi, Math. Comput. 75 (2006) 1833–1852], we derive fast summation techniques for the evaluation of discrete-velocity schemes which permits to reduce the computational cost from O(N2d + 1) to O(N̅dNd log2N), N̅ ≪ N, with almost no loss of accuracy
The Boltzmann equation is essential to the accurate modeling of rarefied gases. Unfortunately, tradi...
In this paper we deal with the extension of the Fast Kinetic Scheme (FKS) (Dimarco and Loubère, 201...
The Boltzmann equation offers a mesoscopic description of rarefied gases and is a typical represent...
Discrete-velocity approximations represent a popular way for computing the Boltzmann collision opera...
The development of accurate and fast numerical schemes for the five fold Boltzmann collision integr...
We present a discrete velocity scheme which solves the Boltzmann equation and show numerical results...
textA new discrete velocity scheme for solving the Boltzmann equation has been implemented for homog...
AbstractWithin the framework of a discrete ordinates approximation, two conservative methods of eval...
Abstract. This paper introduces a fast algorithm for the energy space boson Boltzmann collision oper...
AbstractIn this paper, we investigate a method of realization of the discrete velocity approximation...
A discrete velocity model (DVM) of the Boltzmann equation based on a suitable transformation (Carlem...
An approximation procedure for the Boltzmann equation based on random choices of collision pairs fro...
AbstractIn the present paper we develop a new kind of discrete velocity models to discretize the Bol...
In this paper we show that the use of spectral-Galerkin methods for the approximation of the Boltzma...
Two convergence results related to the approximation of the Boltzmann equation by discrete velocity ...
The Boltzmann equation is essential to the accurate modeling of rarefied gases. Unfortunately, tradi...
In this paper we deal with the extension of the Fast Kinetic Scheme (FKS) (Dimarco and Loubère, 201...
The Boltzmann equation offers a mesoscopic description of rarefied gases and is a typical represent...
Discrete-velocity approximations represent a popular way for computing the Boltzmann collision opera...
The development of accurate and fast numerical schemes for the five fold Boltzmann collision integr...
We present a discrete velocity scheme which solves the Boltzmann equation and show numerical results...
textA new discrete velocity scheme for solving the Boltzmann equation has been implemented for homog...
AbstractWithin the framework of a discrete ordinates approximation, two conservative methods of eval...
Abstract. This paper introduces a fast algorithm for the energy space boson Boltzmann collision oper...
AbstractIn this paper, we investigate a method of realization of the discrete velocity approximation...
A discrete velocity model (DVM) of the Boltzmann equation based on a suitable transformation (Carlem...
An approximation procedure for the Boltzmann equation based on random choices of collision pairs fro...
AbstractIn the present paper we develop a new kind of discrete velocity models to discretize the Bol...
In this paper we show that the use of spectral-Galerkin methods for the approximation of the Boltzma...
Two convergence results related to the approximation of the Boltzmann equation by discrete velocity ...
The Boltzmann equation is essential to the accurate modeling of rarefied gases. Unfortunately, tradi...
In this paper we deal with the extension of the Fast Kinetic Scheme (FKS) (Dimarco and Loubère, 201...
The Boltzmann equation offers a mesoscopic description of rarefied gases and is a typical represent...