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LI JI BIN . CHEN FENG JUAN ZHU

ISBN 10: 7030347404 ISBN 13: 9787030347404

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About this Item: paperback. Condition: New. Ship out in 2 business day, And Fast shipping, Free Tracking number will be provided after the shipment.Paperback. Pub Date :2012-06-01 Pages: 324 Publisher: Science Press title: Chaos and the Melnikov method and new development original price: $ 75.00 Author: LI Ji-bin. Chen Fengjuan Publisher: Scientific Publishing Date: 2012 -6-1ISBN: 9787030347404 Words: 408.000 yards: 324 Edition: 1 Binding: Paperback: 16 Weight: Editor's Choice Chaos readers the Mel'nikov methods and new development. primarily for applications in power system. also can be used as master's graduate students. doctoral students and staff interested in ordinary differential equations and dynamical systems primer. Introduced the basic available on chaos and its researchers interested in the application reference. Reading this book need to learn the basics of mathematical analysis and differential equations courses. Summary physical. chemical. mechanical and biological material movement in mathematical models often use differential equations defined by continuous dynamic systems to simulate these dynamics model complex dynamical behavior - chaotic nature. Chaos. Mel'nikov method and the new development is introduced to accurately determine the Mel'nikov method. with the chaotic nature of the sense of the presence of Smale horseshoe homoclinic and heteroclinic scholars in recent years developed and introduced to the dissipative saddle periodic orbits homoclinic and heteroclinic tangles theory. Catalogue of modern mathematics-Series Preface Preface Chapter 1 the basic concepts of the dynamical system 1.2 Basic definitions and nature of the 1.1 flow and discrete dynamical systems 1.3 topologically conjugate symbolic dynamical system of structural stability and branches in Chapter 2. the finite type shift Chapter 3 bit chaotic concept 2.1 symbolic dynamical system 2.2 finite type subshift 2.4 2.3 Li-Yorke the theorem and Sarkovskii sequence Chaos promotion of the concept of second-order differential systems with two-dimensional mapping of the second-order cycle 3.1 Periodic Differential System harmonic solution of 3.2 3.3 Poincar mapping linear approximation and stability of periodic solutions pulse excitation systems Poincar map 3.4 two-dimensional linear mapping 3.5 two-dimensional mapping of Hopf branches and Arnold tongue Chapter 4 Smale horseshoe and cross section homoclinic ring 4.1 Smale horseshoe to map 4.2 Moser theorem and its promotion 4.3 two-dimensional hyperbolic diffeomorphism invariant set. tracking Lemma Smale-Birkhoff Theorem 4.4 Rm Cr diffeomorphism the invariant set hyperbolicity 4.5 branches to infinity a sink 4.6 Hnon map Smale horseshoe Chapter 5 flat-Hamilton system and change system 5.1 two-dimensional integrable systems and the role - angle variable 5.2 changes the definitions and examples of the power system of 530 categories symmetric system cycle track family homoclinic orbit 5.4 Periodic Solutions family cycle monotonicity Chapter 6 the Mel'nikov methods: perturbation integrable system Chaos Criterion 6.1 by replacement method derived the Mel'nikov function of 6.2 subharmonic branching existence of homoclinic branches Chapter 7 of the relationship between 6.3 times the stability of the harmonic solutions of 6.4 cycles disturbance system the Mel'nikov integral 6.5 cycle perturbations system the subharmonic Mel'nikov function homoclinic orbits 6.6 slow variable oscillator periodic orbits 6.7 slowly varying oscillator Mel'nikov method: Application 7.1 soft spring Duffing system subharmonic horseshoe 7.3 Josephson junction I ~~ V characteristic curve of 7.4 Torus Van der Pol equation with the the Horseshoe 7.2 has a symmetric heteroclinic ring system sub-harmonic subharmonic branching with horseshoe periodic solutions and homoclinic branches of the Lorenz equations 7.8 with two degrees of freedom Hamiltonian system of the 7.5 branch of biological systems with the chaotic nature of the 760 two-component Bose-Einstein condensate system Chao. Seller Inventory # FT057736

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LI JI BIN . CHEN FENG JUAN ZHU

ISBN 10: 7030347404 ISBN 13: 9787030347404

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From: liu xing (JiangSu, JS, China)

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About this Item: paperback. Condition: New. Ship out in 2 business day, And Fast shipping, Free Tracking number will be provided after the shipment.Paperback. Pub Date :2012-06-01 Pages: 324 Publisher: Science Press title: Chaos and the Melnikov method and new development original price: 75 yuan Author: LI Ji-bin. Chen Fengjuan Publisher: Scientific Publishing Date: 2012 -6-1ISBN: 9787030347404 Words: 408.000 yards: 324 Edition: 1 Binding: Paperback: 16 Weight: Editor's Choice Chaos readers the Mel'nikov methods and new development. primarily for applications in power system. also can be used as master's graduate students. doctoral students and staff interested in ordinary differential equations and dynamical systems primer. Introduced the basic available on chaos and its researchers interested in the application reference. Reading this book need to learn the basics of mathematical analysis and differential equations courses. Summary physical. chemical. mechanical and biological material movement in mathematical models often use differential equations defined by continuous dynamic systems to simulate these dynamics model complex dynamical behavior - chaotic nature. Chaos. Mel'nikov method and the new development is introduced to accurately determine the Mel'nikov method. with the chaotic nature of the sense of the presence of Smale horseshoe homoclinic and heteroclinic scholars in recent years developed and introduced to the dissipative saddle periodic orbits homoclinic and heteroclinic tangles theory. Catalogue of modern mathematics-Series Preface Preface Chapter 1 the basic concepts of the dynamical system 1.2 Basic definitions and nature of the 1.1 flow and discrete dynamical systems 1.3 topologically conjugate symbolic dynamical system of structural stability and branches in Chapter 2. the finite type shift Chapter 3 bit chaotic concept 2.1 symbolic dynamical system 2.2 finite type subshift 2.4 2.3 Li-Yorke the theorem and Sarkovskii sequence Chaos promotion of the concept of second-order differential systems with two-dimensional mapping of the second-order cycle 3.1 Periodic Differential System harmonic solution of 3.2 3.3 Poincar mapping linear approximation and stability of periodic solutions pulse excitation systems Poincar map 3.4 two-dimensional linear mapping 3.5 two-dimensional mapping of Hopf branches and Arnold tongue Chapter 4 Smale horseshoe and cross section homoclinic ring 4.1 Smale horseshoe to map 4.2 Moser theorem and its promotion 4.3 two-dimensional hyperbolic diffeomorphism invariant set. tracking Lemma Smale-Birkhoff Theorem 4.4 Rm Cr diffeomorphism the invariant set hyperbolicity 4.5 branches to infinity a sink 4.6 Hnon map Smale horseshoe Chapter 5 flat-Hamilton system and change system 5.1 two-dimensional integrable systems and the role - angle variable 5.2 changes the definitions and examples of the power system of 530 categories symmetric system cycle track family homoclinic orbit 5.4 Periodic Solutions family cycle monotonicity Chapter 6 the Mel'nikov methods: perturbation integrable system Chaos Criterion 6.1 by replacement method derived the Mel'nikov function of 6.2 subharmonic branching existence of homoclinic branches Chapter 7 of the relationship between 6.3 times the stability of the harmonic solutions of 6.4 cycles disturbance system the Mel'nikov integral 6.5 cycle perturbations system the subharmonic Mel'nikov function homoclinic orbits 6.6 slow variable oscillator periodic orbits 6.7 slowly varying oscillator Mel'nikov method: Application 7.1 soft spring Duffing system subharmonic horseshoe 7.3 Josephson junction I ~~ V characteristic curve of 7.4 Torus Van der Pol equation with the the Horseshoe 7.2 has a symmetric heteroclinic ring system sub-harmonic subharmonic branching with horseshoe periodic solutions and homoclinic branches of the Lorenz equations 7.8 with two degrees of freedom Hamiltonian system of the 7.5 branch of biological systems with the chaotic nature of the 760 two-component Bose-Einstein condensate system Chao. Seller Inventory # EI020882

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LI JI BIN

ISBN 10: 7030347404 ISBN 13: 9787030347404

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From: liu xing (JiangSu, JS, China)

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About this Item: paperback. Condition: New. Ship out in 2 business day, And Fast shipping, Free Tracking number will be provided after the shipment.Paperback. Pub Date: 2012 Pages: 324 Publisher: Science Press Information Title: Chaos Mel'nikov method and new development List Price: $ 75.00 Author: LI Ji-bin Press: Science Press Publication Date: 2012 June 1. ISBN: 9787030347404 Words: Pages: 324 Edition: 1 Binding: Paperback: Weight: Editor's Choice LI Ji-bin. readers Chan Fung Kuen. Dorothy's book the chaotic the Mel'nikov methods and new development. mainly for applications in power system also as a master's graduate. doctoral students and staff interested in ordinary differential equations and dynamical systems primer. Introduced the basic available on chaos and its researchers interested in the application reference. Reading this book need to learn the basics of mathematical analysis and differential equations courses. Summary LI Ji-bin. readers Chan Fung Kuen. Dorothy's book the chaotic the Mel'nikov methods and new development. mainly for applications in power system. also as a master's graduate. doctoral students and staff interested in ordinary differential equations and dynamical systems entry books. Introduced the basic available on chaos and its researchers interested in the application reference. Reading this book need to learn the basics of mathematical analysis and differential equations courses. 1.3 Topology 1.1 flow and discrete dynamical systems 1.2 Basic definitions and nature of the directory modern mathematical foundations Series Preface Preface Chapter 1 of the basic concepts of power systems conjugate symbolic dynamical system of structural stability and branches in Chapter 2. the finite type shift Chapter 3 bit chaotic concept 2.1 symbolic dynamical system 2.2 finite type subshift 2.4 2.3 Li-Yorke the theorem and Sarkovskii sequence Chaos promotion of the concept of second-order differential systems with two-dimensional mapping of the second-order cycle 3.1 Periodic Differential System harmonic solution of 3.2 3.3 Poincar mapping linear approximation and stability of periodic solutions pulse excitation systems Poincar map 3.4 two-dimensional linear mapping 3.5 two-dimensional mapping of Hopf branches and Arnold tongue Chapter 4 Smale horseshoe and cross section homoclinic ring 4.1 Smale horseshoe to map 4.2 Moser theorem and its promotion 4.3 two-dimensional hyperbolic diffeomorphism invariant set. tracking Lemma Smale-Birkhoff Theorem 4.4 Rm Cr diffeomorphism the invariant set hyperbolicity 4.5 branches to infinity a sink 4.6 Hnon map Smale horseshoe Chapter 5 flat-Hamilton system and change system 5.1 two-dimensional integrable systems and the role - angle variable 5.2 changes the definitions and examples of the power system of 530 categories symmetric system cycle track family homoclinic orbit 5.4 Periodic Solutions family cycle monotonicity Chapter 6 the Mel'nikov methods: perturbation integrable system Chaos Criterion 6.1 by replacement method derived the Mel'nikov function of 6.2 subharmonic branching existence of homoclinic branches Chapter 7 of the relationship between 6.3 times the stability of the harmonic solutions of 6.4 cycles disturbance system the Mel'nikov integral 6.5 cycle perturbations system the subharmonic Mel'nikov function homoclinic orbits 6.6 slow variable oscillator periodic orbits 6.7 slowly varying oscillator Mel'nikov method: Application 7.1 soft spring Duffing system subharmonic horseshoe 7.3 Josephson junction I ~~ V characteristic curve of 7.4 Torus Van der Pol equation with the the Horseshoe 7.2 has a symmetric heteroclinic ring system sub-harmonic subharmonic branching with horseshoe periodic solutions and homoclinic branches of the Lorenz equations 7.8 two degrees of freedom Hamiltonian system of the 7.5 branch of biological systems with the chaotic nature of the 760 two-component Bose-Einstein condensate system Chaos and branching 7.7 Rayleigh the chaotic nature Appendix Jacobi elliptic function rational formul. Seller Inventory # FQ011068

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BEN SHE

ISBN 10: 7030347404 ISBN 13: 9787030347404

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From: liu xing (JiangSu, JS, China)

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Price: US$ 103.75
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About this Item: paperback. Condition: New. Ship out in 2 business day, And Fast shipping, Free Tracking number will be provided after the shipment.Paperback. Pub Date: Unknown Publisher: Science Press List Price: $ 75.00 Author: Publisher: Science Press ISBN: 9787030347404 Yema: Revision: Binding: Folio: Published :2012 -6-1 printing time: the number of words: product identification: 22808852 Introduction to physical. chemical. mathematical model of the mechanics and biology of physical movement often using differential equations defined by continuous dynamic systems simulation. these dynamics model complex dynamical behavior - chaotic nature. Chaos. Mel'nikov method and the new development is introduced to accurately determine the Mel'nikov method. with the chaotic nature of the sense of the presence of Smale horseshoe homoclinic and heteroclinic scholars in recent years developed and introduced to the dissipative saddle periodic orbits homoclinic and heteroclinic tangles theory. Author catalog of modern mathematics-Series Preface Preface Chapter 1 of the basic concepts of power systems 1.1 flow and discrete dynamical system 1.2 Basic definitions and properties of 1.3 topology conjugate symbolic dynamical system of structural stability and branches in Chapter 2. limited subshift symbolic dynamical systems and chaos concept 2.1 2.2 finite type subshift Chapter 3 2.3 Li-Yorke the theorem and Sarkovskii sequence 2.4 chaotic promotion of the concept of second-order cycle 3.1 second-order differential systems with two-dimensional mapping cycle differential system harmonics solution of 3.2 pulse incentive system Poincar map 3.3 Poincar mapping linear approximation and stability of periodic solutions 3.4 two-dimensional linear mapping 3.5 two-dimensional mapping Hopf branches and the Arnold tongue 4th Smale horseshoe ring Transversality homoclinic 4.1 Smale Horseshoe Map 4.2 Moser theorem and its promotion 4.3 two-dimensional hyperbolic diffeomorphism invariant set. tracking Lemma and Smale-Birkhoff theorem 4.4 Rm Cr diffeomorphism invariant set hyperbolicity 4.5 branches to the infinite multiple exchange 4.6 on Hnon Smale horseshoe Chapter 5 flat-Hamilton system. and change system 5.1 two-dimensional definitions and examples of integrable systems and the role - angle variable 5.2 changes force system 5.3 categories symmetric system of periodic orbits Family and the the homoclinic orbit 5.4 Periodic Solutions family cycle monotonicity Chapter 6 the Mel'nikov methods: disturbance integrable system of criteria for chaos 6.1 6.2 subharmonic branching existence of homoclinic points Mel'nikov function exported by the replacement method the homoclinic orbits Mel'nikov integral relationship between the branches of the stability of the solution 6.4 6.3 subharmonic periodic disturbance of 6.5 cycles disturbance system subharmonic Mel'nikov function 6.6 slow variable oscillator periodic orbits 6.7 slowly varying oscillator Chapter 7 Mel Subharmonic branching 'nikov subharmonic method: Application 7.1 soft spring Duffing system with horseshoe 7.2 times of symmetric heteroclinic ring system harmonic Van der Pol equation with the horseshoe 7.3 Josephson junction I ~~ V characteristic curves 7.4 Torus periodic solutions and homoclinic branches of the Lorenz equations Chaos and branches of the Horseshoe 7.5 branch of the biological systems and the chaotic nature of the 760 two-component Bose-Einstein condensate system 7.7 Rayleigh number 7.8 with two degrees of freedom Hamiltonian system the chaotic nature Appendix Jacobi elliptic function rational formula of Fourier Series Chapter 8 rank one attractor concept and chaotic dynamics 8.1 rank one attractor concept and theory of chaotic dynamics in ordinary differential equations 8.2 Chapter 9 dissipative saddle point homoclinic wrapped Results dynamics 9.1 Basic equations and return specific derivation in Appendix 9.3 of concrete examples and numerical results mapped 9.2 kinetic results 9.4 mapping R the Mel'nikov function (9.1.3) and the rel. Seller Inventory # EJ011821

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