Titre : | Analysis and simulation of chaotic systems | Type de document : | texte imprimé | Auteurs : | Frank C. HOPPENSTEADT, Auteur | Mention d'édition : | 2nd éd. | Editeur : | Berlin : Springer-Verlag | Année de publication : | 2000 | Collection : | Applied Mathematical Sciences, ISSN 0066-5452 num. 94 | Importance : | 315 p. | ISBN/ISSN/EAN : | 978-0-387-98943-3 | Langues : | Anglais | Catégories : | 00A69 34-01 34Cxx 65L99 93-01 94C99
| Mots-clés : | système linéaire système dynamique bifurcation perturbation | Résumé : | Beginning with realistic mathematical or verbal models of physical or biological phenomena, the author derives tractable mathematical models that are amenable to further mathematical analysis or to elucidating computer simulations. For the most part, derivations are based on perturbation methods. Because of this, the majority of the text is devoted to careful derivations of implicit function theorems, the method of averaging, and quasi-static state approximation methods. The duality between stability and perturbation is developed and used, relying heavily on the concept of stability under persistent disturbances. This explains why stability results developed for quite simple problems are often useful for more complicated, even chaotic, ones. Relevant topics about linear systems, nonlinear oscillations, and stability methods for difference, differential-delay, integro- differential and ordinary and partial differential equations are developed throughout the book. For the second edition, the author has restructured the chapters, placing special emphasis on introductory materials in Chapters 1 and 2 as distinct from presentation materials in Chapters 3 through 8. In addition, more material on bifurcations from the point of view of canonical models, sections on randomly perturbed systems, and several new computer simulations have been added. | Note de contenu : | index, références |
Analysis and simulation of chaotic systems [texte imprimé] / Frank C. HOPPENSTEADT, Auteur . - 2nd éd. . - Berlin : Springer-Verlag, 2000 . - 315 p.. - ( Applied Mathematical Sciences, ISSN 0066-5452; 94) . ISBN : 978-0-387-98943-3 Langues : Anglais Catégories : | 00A69 34-01 34Cxx 65L99 93-01 94C99
| Mots-clés : | système linéaire système dynamique bifurcation perturbation | Résumé : | Beginning with realistic mathematical or verbal models of physical or biological phenomena, the author derives tractable mathematical models that are amenable to further mathematical analysis or to elucidating computer simulations. For the most part, derivations are based on perturbation methods. Because of this, the majority of the text is devoted to careful derivations of implicit function theorems, the method of averaging, and quasi-static state approximation methods. The duality between stability and perturbation is developed and used, relying heavily on the concept of stability under persistent disturbances. This explains why stability results developed for quite simple problems are often useful for more complicated, even chaotic, ones. Relevant topics about linear systems, nonlinear oscillations, and stability methods for difference, differential-delay, integro- differential and ordinary and partial differential equations are developed throughout the book. For the second edition, the author has restructured the chapters, placing special emphasis on introductory materials in Chapters 1 and 2 as distinct from presentation materials in Chapters 3 through 8. In addition, more material on bifurcations from the point of view of canonical models, sections on randomly perturbed systems, and several new computer simulations have been added. | Note de contenu : | index, références |
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