This paper discusses spectral and spectral element methods with Legendre-Gauss-Lobatto nodal basis for general 2nd-order elliptic eigenvalue problems. The special work of this paper is as follows. (1) We prove a priori and a posteriori error estimates for spectral and spectral element methods. (2) We compare between spectral methods, spectral element methods, finite element methods and their derived p-version, h-version, and hp-version methods from accuracy, degree of freedom, and stability and verify that spectral methods and spectral element methods are highly efficient computational methods
[Received on xx September 2006] We develop the a-posteriori error analysis of hp-version interior-pe...
We develop a new reduced basis (RB) method for the rapid and reliable approximation of parametrized ...
We provide a priori error estimates for variational approximations of the ground state eigenvalue an...
Abstract—we provide a priori error estimates for linear elliptic eigenvalue problems based on the sp...
Some mathematical aspects of finite and spectral element discretizations for partial differ-ential e...
International audienceOptimal a priori error bounds are theoretically derived, and numerically verif...
Along with finite differences and finite elements, spectral methods are one of the three main method...
In this article, we introduce and analyse some two-grid methods for nonlinear elliptic eigenvalue pr...
This paper deals with a posteriori error estimators for the linear finite element approx-imation of ...
We propose an a posteriori error estimator for high-order p- or hp-finite element discretizations of...
Spectral element methods (SEM) exhibit exponential convergence only when the solution of the problem...
This thesis focuses on the construction of the eigen-based high-order expansion bases for spectral e...
It is well known that elliptic problems when posed on non-smooth domains, develop singularities. We ...
In a series of papers of which this is the first we study how to solve elliptic problems on polygona...
This work addresses the algorithmical aspects of spectral methods for elliptic equations. We focus o...
[Received on xx September 2006] We develop the a-posteriori error analysis of hp-version interior-pe...
We develop a new reduced basis (RB) method for the rapid and reliable approximation of parametrized ...
We provide a priori error estimates for variational approximations of the ground state eigenvalue an...
Abstract—we provide a priori error estimates for linear elliptic eigenvalue problems based on the sp...
Some mathematical aspects of finite and spectral element discretizations for partial differ-ential e...
International audienceOptimal a priori error bounds are theoretically derived, and numerically verif...
Along with finite differences and finite elements, spectral methods are one of the three main method...
In this article, we introduce and analyse some two-grid methods for nonlinear elliptic eigenvalue pr...
This paper deals with a posteriori error estimators for the linear finite element approx-imation of ...
We propose an a posteriori error estimator for high-order p- or hp-finite element discretizations of...
Spectral element methods (SEM) exhibit exponential convergence only when the solution of the problem...
This thesis focuses on the construction of the eigen-based high-order expansion bases for spectral e...
It is well known that elliptic problems when posed on non-smooth domains, develop singularities. We ...
In a series of papers of which this is the first we study how to solve elliptic problems on polygona...
This work addresses the algorithmical aspects of spectral methods for elliptic equations. We focus o...
[Received on xx September 2006] We develop the a-posteriori error analysis of hp-version interior-pe...
We develop a new reduced basis (RB) method for the rapid and reliable approximation of parametrized ...
We provide a priori error estimates for variational approximations of the ground state eigenvalue an...