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Author:   Michel Demazure ,  D. Chillingworth
Publisher:   Springer-Verlag Berlin and Heidelberg GmbH & Co. KG
Imprint:   Springer-Verlag Berlin and Heidelberg GmbH & Co. K
Edition:   Softcover reprint of the original 1st ed. 2000
Dimensions:   Width: 15.50cm , Height: 1.60cm , Length: 23.50cm
Weight:   0.571kg
ISBN:  

9783540521181

ISBN 10:   3540521186
Pages:   304
Publication Date:   15 December 1999
Audience:   College/higher education ,  Undergraduate ,  Postgraduate, Research & Scholarly
Format:   Paperback
Publisher's Status:   Active
Availability:   In Print  
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Table of Contents

Introduction Notation 1. Local Inversion 1.1 Introduction 1.2 A Preliminary Statement 1.3 Partial Derivatives. Strictly Differentiable Functions 1.4 The Local Inversion Theorem: General Statement 1.5 Functions of Class Cr 1.6 The Local Inversion Theorem for Cr maps 1.8 Generalizations of the Local Inversion Theorem 2. Submanifolds 2.1 Introduction 2.2 Definitions of Submanifolds 2.3 First Examples 2.4 Tangent Spaces of a Submanifold 2.5 Transversality: Intersections 2.6 Transversality: Inverse Images 2.7 The Implicit Function Theorem 2.8 Diffeomorphisms of Submanifolds 2.9 Parametrizations, Immersions and Embeddings 2.10 Proper Maps: Proper Embeddings 2.11 From Submanifolds to Manifolds 2.12 Some History 3. Transversality Theorems 3.1 Introduction 3.2 Countability Properties in Topology 3.3 Negligible Subsets 3.4 The Complement of the Image of a Submanifold 3.5 Sard's Theorem 3.6 Critical Points, Submersions and the Geometrical Form of Sard's Theorem 3.7 The Transversality Theorem: Weak Form 3.8 Jet Spaces 3.9 The Thom Transversality Theorem 3.10 Some History 4. Classification of Differentiable Functions 4.1 Introduction 4.2 Taylor Formulae Without Remainder 4.3 The Problem of Classification of Maps 4.4 Critical Points: the Hessian Form 4.5 The Morse Lemma 4.6 Fiburcations of Critical Points 4.7 Apparent Contour of a Surface in R3 4.8 Maps from R2 into R2. 4.9 Envelopes of Plane Curves 4.10 Caustics 4.11 Genericity and Stability 5. Catastrophe Theory 5.1 Introduction 5.2 The Language of Germs 5.3 r-sufficient Jets; r-determined Germs 5.4 The Jacobian Ideal 5.5 The Theorem on Sufficiency of Jets 5.6 Deformations of a Singularity 5.7 The Principles of Catastrophe Theory 5.8 Catastrophes of Cusp Type 5.9 A Cusp Example 5.10 Liquid-Vapour Equilibrium 5.11 The Elementary Catastrophes 5.12 Catastrophes and Controversies 6. Vector Fields 6.1 Introduction 6.2 Exemples of Vector Fields (Rn Case) 6.3 First Integrals 6.4 Vector Fields on Submanifolds 6.5 The Uniqueness Theorem and Maximal Integral Curves 6.6 Vector Fields on Submanifolds 6.7 One-parameter Groups of Diffeomorphisms 6.8 The Existence Theorem (Local Case) 6.9 The Existence Theorem (Global Case) 6.10 The Integral Flow of a Vector Field 6.11 The Main Features of a Phase Portrait 6.12 Discrete Flows and Continuous Flows 7. Linear Vector Fields 7.1 Introduction 7.2 The Spectrum of an Endomorphism 7.3 Space Decomposition Corresponding to Partition of the Spectrum 7.4 Norm and Eigenvalues 7.5 Contracting, Expanding and Hyperbolic Endommorphisms 7.6 The Exponential of an Endomorphism 7.7 One-parameter Groups of Linear Transformations 7.8 The Image of the Exponential 7.9 Contracting, Expanding and Hyperbolic Exponential Flows 7.10 Topological Classification of Linear Vector Fields 7.11 Topological Classification of Automorphisms 7.12 Classification of Linear Flows in Dimension 2 8 Singular Pints of Vector Fields 8.1 Introduction 8.2 The Classification Problem 8.3 Linearization of a Vector Field in the Neighbourhodd of a Singular Point 8.4 Difficulties with Linearization 8.5 Singularities with Attracting Linearization 8.6 Liapunov Theory 8.7 The Theorems of Grobman and Hartman 8.8 Stable and Unstable Manifolds of a Hyperbolic Singularity 8.9 Differentiable Linearization: Statement of the Problem 8.10 Differentiable Linearization: Resonances 8.11 Differentiable Linearization: The Theorems of Sternberg and Hartman 8.12 Linearization in Dimenension 2 8.13 Some Historical Landmarks 9 Closed Orbits - Structural Stability 9.1 Introduction 9.2 The Poincare Map 9.3 Characteristic Multipliers of a Closed Orbit 9.4 Attracting Closed Orbits 9.5

Reviews

This book gives an introduction to the basic ideas in dynamical systems and catastrophe and bifurcation theory. It starts with the geometrical concepts which are necessary for the rest of the book. In the first four chapters, the author introduces the notion of local inversion for maps, submanifolds, tranversality, and the classical theorems related to the local theory of critical points, that is, Sard's theorem and Morse's lemma. After a study of the classification of differentiable maps, he introduces the notion of germ and shows how catastrophe theory can be used to classify singularities; elementary catastrophes are discussed in Chapter 5. Vector fields are the subject of the rest of the book. Chapter 6 is devoted to enunciating the existence and uniqueness theorems for ordinary differential equations; the notions of first integral, one-parameter group and phase portrait are also introduced in this part. Linear vector fields and the topological classification of flows are studied in Chapter 7. Chapter 8 is devoted to the classification of singular points of vector fields. Lyapunov theory and the theorems of Grobman and Hartman are also described in this chapter. The notions of Poincar?? map and closed orbit, and the concepts necessary for the classification of closed orbits, are the principal ideas of Chapter 9; this chapter finishes with the notion of structural stability and the classification of structurally stable vector fields in dimension 2 and Morse-Smale vector fields. Finally, in Chapter 10 the author defines the idea of bifurcation of phase portraits and describes the simplest local bifurcations: saddle-node bifurcation, Hopf bifurcation, etc. <br>This book can be usedas a textbook for a first course on dynamical systems and bifurcation theory. (Joan Torregrosa, Mathematical Reviews)

This book gives an introduction to the basic ideas in dynamical systems and catastrophe and bifurcation theory. It starts with the geometrical concepts which are necessary for the rest of the book. In the first four chapters, the author introduces the notion of local inversion for maps, submanifolds, tranversality, and the classical theorems related to the local theory of critical points, that is, Sard's theorem and Morse's lemma. After a study of the classification of differentiable maps, he introduces the notion of germ and shows how catastrophe theory can be used to classify singularities; elementary catastrophes are discussed in Chapter 5. Vector fields are the subject of the rest of the book. Chapter 6 is devoted to enunciating the existence and uniqueness theorems for ordinary differential equations; the notions of first integral, one-parameter group and phase portrait are also introduced in this part. Linear vector fields and the topological classification of flows are studied in Chapter 7. Chapter 8 is devoted to the classification of singular points of vector fields. Lyapunov theory and the theorems of Grobman and Hartman are also described in this chapter. The notions of Poincare map and closed orbit, and the concepts necessary for the classification of closed orbits, are the principal ideas of Chapter 9; this chapter finishes with the notion of structural stability and the classification of structurally stable vector fields in dimension 2 and Morse-Smale vector fields. Finally, in Chapter 10 the author defines the idea of bifurcation of phase portraits and describes the simplest local bifurcations: saddle-node bifurcation, Hopf bifurcation, etc. This book can be used as a textbook for a first course on dynamical systems and bifurcation theory. (Joan Torregrosa, Mathematical Reviews)

This book gives an introduction to the basic ideas in dynamical systems and catastrophe and bifurcation theory. It starts with the geometrical concepts which are necessary for the rest of the book. In the first four chapters, the author introduces the notion of local inversion for maps, submanifolds, tranversality, and the classical theorems related to the local theory of critical points, that is, Sard's theorem and Morse's lemma. After a study of the classification of differentiable maps, he introduces the notion of germ and shows how catastrophe theory can be used to classify singularities; elementary catastrophes are discussed in Chapter 5. Vector fields are the subject of the rest of the book. Chapter 6 is devoted to enunciating the existence and uniqueness theorems for ordinary differential equations; the notions of first integral, one-parameter group and phase portrait are also introduced in this part. Linear vector fields and the topological classification of flows are studied in Chapter 7. Chapter 8 is devoted to the classification of singular points of vector fields. Lyapunov theory and the theorems of Grobman and Hartman are also described in this chapter. The notions of PoincarA(c) map and closed orbit, and the concepts necessary for the classification of closed orbits, are the principal ideas of Chapter 9; this chapter finishes with the notion of structural stability and the classification of structurally stable vector fields in dimension 2 and Morse-Smale vector fields. Finally, in Chapter 10 the author defines the idea of bifurcation of phase portraits and describes the simplest local bifurcations: saddle-node bifurcation, Hopf bifurcation, etc. This book can be used as a textbook for a first course on dynamical systems and bifurcation theory. (Joan Torregrosa, Mathematical Reviews)

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