Titre : | Essential mathematical methods for physicists | Type de document : | document imprimé | Auteurs : | H. J. Weber, Auteur ; G. B. Arfken, Auteur | Mention d'édition : | 6th ed. | Editeur : | Amsterdam : Academic Press | Année de publication : | 2004 | Importance : | XXII-932 p. : ill. ; 24 cm | ISBN/ISSN/EAN : | 0-12-059878-7 | Note générale : | Paperback
| Langues : | Français (fre) | Index. décimale : | 02 Mathematical methods in physics, theoretical physics | Résumé : | This revised version of Arken and Weber's reference text contains many more detailed, worked-out examples to illustrate how to use and apply mathematical techniques to solve physics problems. Frequent and thorough explanations help readers to understand, recall and apply the theory. Table of contents: Vector Analysis; Vector Analysis in Curved Coordinated and Tensors; Determinants and Matrices; Group Theory; Infinite Series; Functions of a Complex Variable I; Functions of a Complex Variable II; Differential Equations; Sturm-Liouville Theory - Orthogonal Functions; The Gamma Function (Factorial Function); Legendre Polynomials; Bessell Functions; Hermite and Laguerre Polynomials; Fourier Series; Integral Transforms; Partial Differential Equations; Probability; Calculus of Variations; Non-Linear Methods and Chaos.
| Note de contenu : | Index, p. 911-932
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Essential mathematical methods for physicists [document imprimé] / H. J. Weber, Auteur ; G. B. Arfken, Auteur . - 6th ed. . - Amsterdam : Academic Press, 2004 . - XXII-932 p. : ill. ; 24 cm. ISBN : 0-12-059878-7 Paperback
Langues : Français ( fre) Index. décimale : | 02 Mathematical methods in physics, theoretical physics | Résumé : | This revised version of Arken and Weber's reference text contains many more detailed, worked-out examples to illustrate how to use and apply mathematical techniques to solve physics problems. Frequent and thorough explanations help readers to understand, recall and apply the theory. Table of contents: Vector Analysis; Vector Analysis in Curved Coordinated and Tensors; Determinants and Matrices; Group Theory; Infinite Series; Functions of a Complex Variable I; Functions of a Complex Variable II; Differential Equations; Sturm-Liouville Theory - Orthogonal Functions; The Gamma Function (Factorial Function); Legendre Polynomials; Bessell Functions; Hermite and Laguerre Polynomials; Fourier Series; Integral Transforms; Partial Differential Equations; Probability; Calculus of Variations; Non-Linear Methods and Chaos.
| Note de contenu : | Index, p. 911-932
|
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