Verfügbarkeit: Introduction to nonlinear science | Technische Universität München

Introduction to nonlinear science:

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Bibliographische Detailangaben
Beteilige Person:	Nicolis, Grégoire 1939-2018 (VerfasserIn)
Format:	Buch
Sprache:	Englisch
Veröffentlicht:	Cambridge Cambridge Univ. Press 1995
Ausgabe:	1. publ.
Schlagwörter:	Dynamisches System - Nichtlineares Phänomen Nichtlineares System Nichtlineares Phänomen Chaotisches System Mathematische Physik Nichtlineare Theorie Naturwissenschaften Nichtlineares dynamisches System
Links:	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=006951425&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
Umfang:	XV, 254 S. Ill., graph. Darst.
ISBN:	0521467829 0521462282

Internformat

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Datensatz im Suchindex

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adam_text	Contents Preface xiii 1 Nonlinear behavior in the physical sciences and biology: some typical examples. 1.1 What is nonlinearity? 1 1.2 Nonlinear behavior in classical mechanics 2 1.3 Thermal convection 5 1.4 Nonlinear phenomena in chemistry 12 1.5 Some further examples of chemically mediated nonlinear behavior 19 Problems 23 2 Quantitative formulation 2.1 Evolution equations in classical mechanics 25 2.2 The macroscopic level: balance equation of a macrovariable 29 2.3 Conserved variables in a one component system and the equations of fluid dynamics 30 2.4 Nonconserved variables in a multicomponent system and the equations of chemical kinetics 33 2.5 The Benard problem: quantitative formulation 35 2.6 Some representative chemical models giving rise to nonlinear behavior 40 Problems 45 3 Dynamical systems with a finite number of degrees of freedom 3.1 General orientation 47 3.2 Phase space 49 ix x Contents 3.3 Invariant manifolds 51 3.4 Conservative and dissipative systems. Attractors 58 3.5 Stability 61 3.6 The principle of linearized stability 66 Problems 69 4 Linear stability analysis of fixed points 4.1 General formulation 71 4.2 Systems involving one variable 75 4.3 Systems involving two variables 77 4.4 Examples of stability analysis of two dimensional dynamical systems 84 4.5 Three variables and beyond 87 Problems 92 5 Nonlinear behavior around fixed points: bifurcation analysis 5.1 Introduction 94 5.2 Expansion of the solutions in perturbation series: the case of zero eigenvalue, Re a Q = Im coc = 0 96 5.3 The amplitude equation: transcritical bifurcation 98 5.4 The amplitude equation: pitchfork bifurcation 102 5.5 Limit point bifurcation 104 5.6 Kinetic potential, sensitivity, structural stability 105 5.7 The Hopf bifurcation 110 5.8 Cascading bifurcations 114 5.9 Normal forms and resonances 120 Problems 125 6 Spatially distributed systems, broken symmetries, pattern formation 6.1 General formulation 128 6.2 The Benard problem: reference state and linearization of the Boussinesq equations 129 6.3 The Benard problem: linear stability analysis for free boundaries 133 6.4 Reaction diffusion systems. The Turing instability 138 6.5 Further comments on linear stability in spatially distributed systems 146 6.6 Bifurcation analysis: general formulation 148 6.7 Bifurcation of two dimensional rolls in the Benard problem: the small aspect ratio case 151 Contents xi 6.8 Bifurcation analysis in systems of large spatial extent: complex Landau Ginzburg equation 156 6.9 Further examples of normal form envelope equations in large systems 161 Problems 169 7 Chaotic dynamics 7.1 The Poincare map 173 7.2 One dimensional recurrences: general aspects 178 7.3 Phenomenology of one dimensional recurrences: illustrations 180 7.4 Tools of chaos theory 188 7.5 Routes to chaos: quantitative formulation 192 7.6 Fully developed chaos: probabilistic description 196 7.7 Error growth, Lyapunov exponents and predictability 205 7.8 The dynamics of symbolic sequences: entropy, master equation 211 7.9 Spatio temporal chaos 220 Problems 227 Appendices Al Proof of the principle of linearized stability for one variable systems 230 A2 Hopf bifurcation analysis of the Brusselator model 234 References 239 Index 251
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author	Nicolis, Grégoire 1939-2018
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discipline	Allgemeine Naturwissenschaft Physik Mathematik
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language	English
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spellingShingle	Nicolis, Grégoire 1939-2018 Introduction to nonlinear science Dynamisches System - Nichtlineares Phänomen Nichtlineares System Nichtlineares Phänomen (DE-588)4136065-5 gnd Chaotisches System (DE-588)4316104-2 gnd Mathematische Physik (DE-588)4037952-8 gnd Nichtlineare Theorie (DE-588)4251279-7 gnd Naturwissenschaften (DE-588)4041421-8 gnd Nichtlineares dynamisches System (DE-588)4126142-2 gnd
subject_GND	(DE-588)4136065-5 (DE-588)4316104-2 (DE-588)4037952-8 (DE-588)4251279-7 (DE-588)4041421-8 (DE-588)4126142-2
title	Introduction to nonlinear science
title_auth	Introduction to nonlinear science
title_exact_search	Introduction to nonlinear science
title_full	Introduction to nonlinear science G. Nicolis
title_fullStr	Introduction to nonlinear science G. Nicolis
title_full_unstemmed	Introduction to nonlinear science G. Nicolis
title_short	Introduction to nonlinear science
title_sort	introduction to nonlinear science
topic	Dynamisches System - Nichtlineares Phänomen Nichtlineares System Nichtlineares Phänomen (DE-588)4136065-5 gnd Chaotisches System (DE-588)4316104-2 gnd Mathematische Physik (DE-588)4037952-8 gnd Nichtlineare Theorie (DE-588)4251279-7 gnd Naturwissenschaften (DE-588)4041421-8 gnd Nichtlineares dynamisches System (DE-588)4126142-2 gnd
topic_facet	Dynamisches System - Nichtlineares Phänomen Nichtlineares System Nichtlineares Phänomen Chaotisches System Mathematische Physik Nichtlineare Theorie Naturwissenschaften Nichtlineares dynamisches System
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work_keys_str_mv	AT nicolisgregoire introductiontononlinearscience

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