Spectral Integration and Two-Point Boundary Value Problems

Spectral Integration and Two-Point Boundary Value Problems

A numerical method for two-point boundary value problems with constant coefficients is developed which is based on integral equations and the spectral integration matrix for Chebyshev nodes. The method is stable, achieves superalgebraic convergence, and requires O(N log N) operations, where N is the...

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Veröffentlicht in:SIAM journal on numerical analysis 1991-08, Vol.28 (4), p.1071-1080
1. Verfasser: Greengard, L.
Format: Artikel
Sprache:eng
Schlagworte:
Boundary conditions
Boundary value problems
Coefficients
Constant coefficients
Differential equations
Exact sciences and technology
Fourier transforms
Integral equations
Mathematical differentiation
Mathematical functions
Mathematics
Numerical analysis
Numerical analysis. Scientific computation
Numerical approximation
Partial differential equations
Recurrence relations
Sciences and techniques of general use
Series expansion
Spectral methods
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Beschreibung
Zusammenfassung:A numerical method for two-point boundary value problems with constant coefficients is developed which is based on integral equations and the spectral integration matrix for Chebyshev nodes. The method is stable, achieves superalgebraic convergence, and requires O(N log N) operations, where N is the number of nodes in the discretization. Although stable spectral methods have been constructed in the past, they have generally been based on reformulating the recurrence relations obtained through spectral differentiation in an attempt to avoid the ill-conditioning introduced by that process.
ISSN:0036-1429
1095-7170
DOI:10.1137/0728057