http://www.cnr.it/ontology/cnr/individuo/prodotto/ID285804
The mimetic finite difference method for elliptic problems (Monografia o trattato scientifico)
- Type
- Label
- The mimetic finite difference method for elliptic problems (Monografia o trattato scientifico) (literal)
- Anno
- 2014-01-01T00:00:00+01:00 (literal)
- Alternative label
Beirao da Veiga, Lourenco; Lipnikov, Konstantin; Manzini, Gianmarco (2014)
The mimetic finite difference method for elliptic problems
Springer International Publishing, CH-6330 Cham (ZG) (Svizzera), 2014
(literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#autori
- Beirao da Veiga, Lourenco; Lipnikov, Konstantin; Manzini, Gianmarco (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#url
- http://www.springer.com/mathematics/computational+science+%26+engineering/book/978-3-319-02662-6 (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#titoloVolume
- The mimetic finite difference method (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#volumeInCollana
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#pagineTotali
- Note
- athematical Reviews on the web (MathSciNet) (literal)
- ISI Web of Science (WOS) (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#affiliazioni
- Dipartimento di Matematica \"Federico Enriques\", Università degli Studi di Milano, Italy ;
Theoretical Division, Los Alamos National Laboratory, USA;
IMATI-CNR, Pavia, Italy (literal)
- Titolo
- The mimetic finite difference method for elliptic problems (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#isbn
- 978-3-319-02662-6 (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#autoriVolume
- L. Beirao da Veiga, K. Lipnikov, G. Manzini (literal)
- Abstract
- This book offers a systematic and thorough examination of theoretical and computational aspects of the modem mimetic finite difference (MFD) method. The MFD method preserves or mimics underlying properties of physical and mathematical models, thereby improving the fidelity and predictive capability of computer simulations. We focus here on the numerical solution of elliptic partial differential equation (PDEs) on unstructured polygonal and polyhedral meshes for which the MFD method has proven to be very successful in the last five decades. (literal)
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