Reviving the Method of Particular Solutions

Reviving the Method of Particular Solutions

Fox, Henrici, and Moler made famous a "method of particular solutions" for computing eigenvalues and eigenmodes of the Laplacian in planar regions such as polygons. We explain why their formulation of this method breaks down when applied to regions that are insufficiently simple and propos...

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Veröffentlicht in:SIAM review 2005-09, Vol.47 (3), p.469-491
Hauptverfasser: Betcke, Timo, Trefethen, Lloyd N.
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
Approximation
Boundary conditions
Boundary points
Eigenfunctions
Eigenvalues
Exact sciences and technology
Interior points
Mathematical functions
Mathematical problems
Mathematical vectors
Mathematics
Methods
Numerical analysis
Numerical analysis. Scientific computation
Numerical linear algebra
Partial differential equations, boundary value problems
Polygons
Problems and Techniques
Sciences and techniques of general use
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Beschreibung
Zusammenfassung:Fox, Henrici, and Moler made famous a "method of particular solutions" for computing eigenvalues and eigenmodes of the Laplacian in planar regions such as polygons. We explain why their formulation of this method breaks down when applied to regions that are insufficiently simple and propose a modification that avoids these difficulties. The crucial changes are to introduce points in the interior of the region as well as on the boundary and to minimize a subspace angle rather than just a singular value or a determinant. Similar methods may be used to improve other "mesh-free" algorithms for a variety of computational problems.
ISSN:0036-1445
1095-7200
DOI:10.1137/S0036144503437336