Bifurcation Theory of Functional Differential Equations
(Sprache: Englisch)
This book provides a crash course on various methods from the bifurcation
theory of Functional Differential Equations (FDEs). FDEs arise very naturally in economics, life sciences and engineering and the study of FDEs has been a major source of...
theory of Functional Differential Equations (FDEs). FDEs arise very naturally in economics, life sciences and engineering and the study of FDEs has been a major source of...
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This book provides a crash course on various methods from the bifurcation
theory of Functional Differential Equations (FDEs). FDEs arise very naturally in economics, life sciences and engineering and the study of FDEs has been a major source of inspiration for advancement in nonlinear analysis and infinite dimensional dynamical systems. The book summarizes some practical and general approaches and frameworks for the investigation of bifurcation phenomena of FDEs depending on parameters with chap. This well illustrated book aims to be self contained
so the readers will find in this book all relevant materials in
bifurcation, dynamical systems with symmetry, functional differential
equations, normal forms and center manifold reduction. This material was used in graduate courses on functional differential equations at Hunan University (China) and York University (Canada).
theory of Functional Differential Equations (FDEs). FDEs arise very naturally in economics, life sciences and engineering and the study of FDEs has been a major source of inspiration for advancement in nonlinear analysis and infinite dimensional dynamical systems. The book summarizes some practical and general approaches and frameworks for the investigation of bifurcation phenomena of FDEs depending on parameters with chap. This well illustrated book aims to be self contained
so the readers will find in this book all relevant materials in
bifurcation, dynamical systems with symmetry, functional differential
equations, normal forms and center manifold reduction. This material was used in graduate courses on functional differential equations at Hunan University (China) and York University (Canada).
Klappentext zu „Bifurcation Theory of Functional Differential Equations “
This book provides a crash course on various methods from the bifurcation theory of Functional Differential Equations (FDEs). FDEs arise very naturally in economics, life sciences and engineering and the study of FDEs has been a major source of inspiration for advancement in nonlinear analysis and infinite dimensional dynamical systems. The book summarizes some practical and general approaches and frameworks for the investigation of bifurcation phenomena of FDEs depending on parameters with chap. This well illustrated book aims to be self contained so the readers will find in this book all relevant materials in bifurcation, dynamical systems with symmetry, functional differential equations, normal forms and center manifold reduction. This material was used in graduate courses on functional differential equations at Hunan University (China) and York University (Canada).
Inhaltsverzeichnis zu „Bifurcation Theory of Functional Differential Equations “
Introduction to Dynamic Bifurcation Theory.- Introduction to Functional Differential Equations.-Center Manifold Reduction.- Normal form theory.- Lyapunov-Schmidt Reduction.- Degree theory.- Bifurcation in Symmetric FDEs.
Autoren-Porträt von Shangjiang Guo, Jianhong Wu
Shangjiang Guo is a Professor at Hunan University. Jianhong Wu is a Professor at York University.
Bibliographische Angaben
- Autoren: Shangjiang Guo , Jianhong Wu
- 2013, 2013, IX, 289 Seiten, Maße: 16 x 24,1 cm, Gebunden, Englisch
- Verlag: Springer, Berlin
- ISBN-10: 1461469910
- ISBN-13: 9781461469919
- Erscheinungsdatum: 30.07.2013
Sprache:
Englisch
Pressezitat
"The book contains a comprehensive list of references to the subject and can be particularly helpful for readers who are interested in the mathematical details that arise in the study of bifurcations in functional differential equations." (Matthias Wolfrum, zbMATH 1316.34003, 2015)
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