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2008
2008
Nontensorial Clenshaw-Curtis cubature
We extend Clenshaw-Curtis quadrature to the square in a nontensorial way, by using Sloan's hyperinterpolation theory and two families of points recently studied in the framework of bivariate (hyper)interpolation, namely the Morrow-Patterson-Xu points and the Padua points. The construction is an application of a general approach to product-type cubature, where we prove also a relevant stability theorem. The resulting cubature formulas turn out to be competitive on nonentire integrands with tensorproduct Clenshaw-Curtis and Gauss-Legendre formulas, and even with the few known minimal formulas. 2000 AMS subject classification: 65D32.
Real-time Traffic| Added | 14 Dec 2010 |
| Updated | 14 Dec 2010 |
| Type | Journal |
| Year | 2008 |
| Where | NA |
| Authors | Alvise Sommariva, Marco Vianello, Renato Zanovello |
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