http://www.cnr.it/ontology/cnr/individuo/prodotto/ID75666
Generalized de la Vallée Poussin operators for Jacobi weights (Contributo in atti di convegno)
- Type
- Label
- Generalized de la Vallée Poussin operators for Jacobi weights (Contributo in atti di convegno) (literal)
- Anno
- 2006-01-01T00:00:00+01:00 (literal)
- Alternative label
F. Filbir; W. Themistoclakis (2006)
Generalized de la Vallée Poussin operators for Jacobi weights
in NAAT - International Conference on Numerical Analysis and Approximation Theory, Babes-Bolyai University, Cluj-Napoca, Romania., 4-8 Luglio, 2006
(literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#autori
- F. Filbir; W. Themistoclakis (literal)
- Pagina inizio
- Pagina fine
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#altreInformazioni
- EDITORI: Octavian Agratini and Petru Blaga, Babes-Bolyai University, Cluj-Napoca.
CASA EDITRICE: Casa Cartii de Stiinta, Cluj-Napoca, Romania.
Anno di Pubblicazione: 2006.
ISBN 973-686-961-X; 978-973-686-961-7. (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#titoloVolume
- Proceedings of the International Conference on Numerical Analysis and Approximation Theory. Cluj-Napoca, Romania, July 4-8, 2006 (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#note
- July 5-8 2006, pp. 195-204 (literal)
- Note
- athematical Reviews on the web (MathSciNet (literal)
- Google Scholar (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#affiliazioni
- F. Filbir: Institute for Biomathematics and Biometry, GSF Research Center, Neuherberg, Germany. -
W. Themistoclakis: CNR, Istituto per le Applicazioni del Calcolo \"Mauro Picone\", sede di Napoli, Italy (literal)
- Titolo
- Generalized de la Vallée Poussin operators for Jacobi weights (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#isbn
- 978-973-686-961-7 (literal)
- Abstract
- Starting from a natural generalization of the trigonometric case, we construct a de la Vall\'ee Poussin approximation process in the uniform and L1 norms. With respect to the classical approach we obtain the convergence for a wider class of Jacobi weights. Even if we only consider the Jacobi case, our construction is very general and can be extended to other classes of weights. (literal)
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