| Titre : | Computational methods for integral equations |
| Auteurs : | l. M. Delves, Auteur ; J. L. Mohamed, Auteur |
| Type de document : | texte imprimé |
| Editeur : | Cambridge : Cambridge University Press, 1985 |
| ISBN/ISSN/EAN : | 978-0-521-26629-1 |
| Format : | 373 p. / ill. / 24 cm |
| Note générale : | Bibliogr. p. [370] - 373. Index |
| Langues : | Anglais |
| Index. décimale : | 517.3 (Calcul intégral. Intégration) |
| Tags : | Integral equations -- Numerical solutions. |
| Résumé : | Integral equations form an important class of problems, arising fraquently in engineering, and mathematical and scientific analysis, This book provides an up-to-date and readable account of techniques for their numerical solution. |
| Note de contenu : |
Sommaire : 0 - Introduction and preliminaries 1 - The space L2 (a,b) 2 - Numerical quadrature 3 - Introduction to the theory of linear integral equations of the second kind 4 - The nystrom(quadrature) method for fredholm equations of the second kind 5 - Quadrature methods for volterra equations of the second kind 6 - eigenvalue problems and the fredholm alternative 7 - Expansion methods for fredholm equations of the second kind 8 - Numerical techniques for expansion methods 9 - Analysis of the galerkin method with orthogonal basis 10 - Numerical performance of algorithms for fredholm equations of the second kind 11 - Singular integral equations 12 - Integral equations of the first kind 13 - Integro-differential equations |
Exemplaires (1)
| Cote | Support | Localisation | Section | Disponibilité | Etat_Exemplaire |
|---|---|---|---|---|---|
| 517.3 DEL | Papier | Bibliothèque Centrale | Mathématiques | Disponible |

