Add to ORKGWe are interested in the discretization of the heat equation with a diffusion coefficient depending on the space and time variables. The discretization relies on a spectral element method with respect to the space variables and Euler's implicit scheme with respect to the time variable. A detailed numerical analysis leads to optimal a priori error estimates
Although spectral methods proved to be numerical methods that can significantly speed up the computa...
Abstract. We develop a spectrally accurate numerical algorithm to compute solutions of a model parti...
The convergence features of a preconditioned algorithm for the convection-diffusion equation based o...
summary:We are interested in the discretization of the heat equation with a diffusion coefficient de...
Abstract We propose to implement the mortar spectral elements discretization of the heat equation in...
The paper deals with a posteriori analysis of the spectral element discretization of a non linear he...
The multidimensional heat equation, along with its more general version known as the (linear) anisot...
The book deals with the numerical approximation of various PDEs using the spectral element method, w...
In this paper, we consider a heat equation with diffusion coefficient that varies depending on the h...
Several explicit Taylor-Galerkin-based time integration schemes are proposed for the solution of bot...
AbstractThe classical heat diffusion theory based on the Fourier’s model breaks down when considerin...
Some mathematical aspects of finite and spectral element discretizations for partial differ-ential e...
In this paper, the spectral-element method formulation is extended to deal with semi-infinite and in...
Spectral methods can solve elliptic partial differential equations (PDEs) numerically with errors bo...
Nous considérons dans cette thèse la discrétisation par la méthode spectrale et la simulation numéri...
Although spectral methods proved to be numerical methods that can significantly speed up the computa...
Abstract. We develop a spectrally accurate numerical algorithm to compute solutions of a model parti...
The convergence features of a preconditioned algorithm for the convection-diffusion equation based o...
summary:We are interested in the discretization of the heat equation with a diffusion coefficient de...
Abstract We propose to implement the mortar spectral elements discretization of the heat equation in...
The paper deals with a posteriori analysis of the spectral element discretization of a non linear he...
The multidimensional heat equation, along with its more general version known as the (linear) anisot...
The book deals with the numerical approximation of various PDEs using the spectral element method, w...
In this paper, we consider a heat equation with diffusion coefficient that varies depending on the h...
Several explicit Taylor-Galerkin-based time integration schemes are proposed for the solution of bot...
AbstractThe classical heat diffusion theory based on the Fourier’s model breaks down when considerin...
Some mathematical aspects of finite and spectral element discretizations for partial differ-ential e...
In this paper, the spectral-element method formulation is extended to deal with semi-infinite and in...
Spectral methods can solve elliptic partial differential equations (PDEs) numerically with errors bo...
Nous considérons dans cette thèse la discrétisation par la méthode spectrale et la simulation numéri...
Although spectral methods proved to be numerical methods that can significantly speed up the computa...
Abstract. We develop a spectrally accurate numerical algorithm to compute solutions of a model parti...
The convergence features of a preconditioned algorithm for the convection-diffusion equation based o...