This paper serves as our first effort to develop a new triangular spectral element method (TSEM) on unstructured meshes, using the rectangle-triangle mapping proposed in the conference note (Li et al. 2011). Here, we provide some new insights into the originality and distinctive features of the mapping, and show that this transform only induces a logarithmic singularity, which allows us to devise a fast, stable and accurate numerical algorithm for its removal. Consequently, any triangular element can be treated as efficiently as a quadrilateral element, which affords a great flexibility in handling complex computational domains. Benefited from the fact that the image of the mapping includes the polynomial space as a subset, we are able to o...
International audienceUsing the spectral element method (SEM), or more generally hp-finite elements,...
In this paper, we demonstrate that many of the computational tools for univariate orthogonal polynom...
This thesis examines the extension of the Spectral Difference (SD) method on unstructured hybrid gri...
Abstract We propose in this note a spectral method on triangles based on a new rectangle-to-triangle...
In this paper, we implement and analyse a spectral element method (SEM) on hybrid triangular and qua...
Abstract. A rational approximation in a triangle is proposed and analyzed in this paper. The rationa...
In the first portion of this thesis, a new well-conditioned collocation method for solving different...
Global spectral methods often give exponential convergence rates and have high accuracy, but are uns...
. This paper presents an asymptotically stable scheme for the spectral approximation of linear conse...
International audienceA Triangular Spectral Element Method (TSEM) is presented to simulate elastic w...
We discuss the use of triangular elements in the spectral element method for direct simulation of in...
We propose a new spectral element method based on Fekete points. We use the Fekete criterion to comp...
International audienceWe investigate the cubature points based triangular spectral element method an...
The Poisson problem with homogeneous Dirichlet boundary conditions is considered on a triangle. The ...
The article of record as published may be located at http://dx.doi.org/10.1016/j.jcp.2005.01.004A no...
International audienceUsing the spectral element method (SEM), or more generally hp-finite elements,...
In this paper, we demonstrate that many of the computational tools for univariate orthogonal polynom...
This thesis examines the extension of the Spectral Difference (SD) method on unstructured hybrid gri...
Abstract We propose in this note a spectral method on triangles based on a new rectangle-to-triangle...
In this paper, we implement and analyse a spectral element method (SEM) on hybrid triangular and qua...
Abstract. A rational approximation in a triangle is proposed and analyzed in this paper. The rationa...
In the first portion of this thesis, a new well-conditioned collocation method for solving different...
Global spectral methods often give exponential convergence rates and have high accuracy, but are uns...
. This paper presents an asymptotically stable scheme for the spectral approximation of linear conse...
International audienceA Triangular Spectral Element Method (TSEM) is presented to simulate elastic w...
We discuss the use of triangular elements in the spectral element method for direct simulation of in...
We propose a new spectral element method based on Fekete points. We use the Fekete criterion to comp...
International audienceWe investigate the cubature points based triangular spectral element method an...
The Poisson problem with homogeneous Dirichlet boundary conditions is considered on a triangle. The ...
The article of record as published may be located at http://dx.doi.org/10.1016/j.jcp.2005.01.004A no...
International audienceUsing the spectral element method (SEM), or more generally hp-finite elements,...
In this paper, we demonstrate that many of the computational tools for univariate orthogonal polynom...
This thesis examines the extension of the Spectral Difference (SD) method on unstructured hybrid gri...