Spectral Methods for Initial Boundary Value Problems--An Alternative Approach

This paper presents a new approach to spectral methods for initial boundary value problems. A filtered version of the partial differential equation and the initial and boundary conditions at an overdetermined set of points are collocated. As an approximate solution, the function is chosen that belon...

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Vydáno v:	SIAM journal on numerical analysis Ročník 27; číslo 4; s. 885 - 903
Hlavní autor:	Dutt, P.
Médium:	Journal Article
Jazyk:	angličtina
Vydáno:	Philadelphia, PA Society for Industrial and Applied Mathematics 01.08.1990
Témata:	Accuracy Applied mathematics Boundary conditions Boundary value problems Continuous functions Degrees of polynomials Eigenvalues Exact sciences and technology Mathematics Methods Numerical analysis Numerical analysis. Scientific computation Parameter estimation Partial differential equations Partial differential equations, initial value problems and time-dependant initial-boundary value problems Polynomials Preliminary estimates Sciences and techniques of general use Spectral methods Vector spaces Quadrature Boundary value problem Multigrid Tchebychev polynomial Initial value problem Partial differential equation
ISSN:	0036-1429, 1095-7170
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Popis
Shrnutí:	This paper presents a new approach to spectral methods for initial boundary value problems. A filtered version of the partial differential equation and the initial and boundary conditions at an overdetermined set of points are collocated. As an approximate solution, the function is chosen that belongs to an appropriate finite-dimensional space and minimizes a weighted average of the residuals at these points. It is proved that the approximate solution converges to the actual solution at a spectral rate of accuracy in both space and time. The proof is based on a priori energy estimates that have been proved for such systems. Although this method is restricted here to hyperbolic initial boundary value problems and Chebyshev polynomials, it generalizes to general initial boundary value problems, boundary value problems, and Gegenbauer polynomials.
Bibliografie:	ObjectType-Article-1 SourceType-Scholarly Journals-1 content type line 14
ISSN:	0036-1429 1095-7170
DOI:	10.1137/0727051