Add to ORKGPseudospectral differentiation matrices suffer from large round-off error, and give rise to illconditioned systems used to solve differential equations numerically. This thesis presents two types of matrices designed to precondition these systems and improve robustness towards this round-off error for spectral methods on Chebyshev-Gauss-Lobatto points. The first of these is a generalization of a pseudospectral integration matrix described by Wang et al. [18]. The second uses this integration matrix to construct the matrix representing the inverse operator of the differential equation. Comparison is made between expected and calculated eigenvalues. Both preconditioners are tested on several examples. In many cases, accuracy is improved over ...
Two decades ago collocation methods for high accuracy solutions of partial differential equations se...
Abstract approved. Spectral integration methods have been introduced for constant-coefficient two-po...
The problem of preconditioning the pseudospectral Chebyshev approximation of an elliptic operator is...
Spectral/pseudospectral integration preconditioning matrices are useful tools for solving differenti...
AbstractWe discuss here the errors incurred using the standard formula for calculating the pseudospe...
AbstractWe discuss here the errors incurred using the standard formula for calculating the pseudospe...
Spectral integration is a method for solving linear boundary value problems which uses the Chebyshev...
AbstractA matrix representation of integration for arbitrary grids is introduced. Suitable results a...
Single domain spectral/pseudospectral integration preconditioning matrices have been shown to be eff...
In this paper we give integral expressions for the elements of the inverses of second-order pseudosp...
In this paper we give integral expressions for the elements of the inverses of second-order pseudosp...
In this paper, a well-conditioned collocation method is constructed for solving general $p$th order ...
In this paper we give integral expressions for the elements of the inverses of second-order pseudosp...
In this paper we give integral expressions for the elements of the inverses of second-order pseudosp...
Two decades ago collocation methods for high accuracy solutions of partial differential equations se...
Two decades ago collocation methods for high accuracy solutions of partial differential equations se...
Abstract approved. Spectral integration methods have been introduced for constant-coefficient two-po...
The problem of preconditioning the pseudospectral Chebyshev approximation of an elliptic operator is...
Spectral/pseudospectral integration preconditioning matrices are useful tools for solving differenti...
AbstractWe discuss here the errors incurred using the standard formula for calculating the pseudospe...
AbstractWe discuss here the errors incurred using the standard formula for calculating the pseudospe...
Spectral integration is a method for solving linear boundary value problems which uses the Chebyshev...
AbstractA matrix representation of integration for arbitrary grids is introduced. Suitable results a...
Single domain spectral/pseudospectral integration preconditioning matrices have been shown to be eff...
In this paper we give integral expressions for the elements of the inverses of second-order pseudosp...
In this paper we give integral expressions for the elements of the inverses of second-order pseudosp...
In this paper, a well-conditioned collocation method is constructed for solving general $p$th order ...
In this paper we give integral expressions for the elements of the inverses of second-order pseudosp...
In this paper we give integral expressions for the elements of the inverses of second-order pseudosp...
Two decades ago collocation methods for high accuracy solutions of partial differential equations se...
Two decades ago collocation methods for high accuracy solutions of partial differential equations se...
Abstract approved. Spectral integration methods have been introduced for constant-coefficient two-po...
The problem of preconditioning the pseudospectral Chebyshev approximation of an elliptic operator is...