Differential geometry applied to dynamical systems [[electronic resource] /] / Jean-Marc Ginoux |
Autore | Ginoux Jean-Marc |
Pubbl/distr/stampa | New Jersey, : World Scientific, c2009 |
Descrizione fisica | 1 online resource (341 p.) |
Disciplina | 519 |
Collana | World Scientific series on nonlinear science. Series A, Monographs and treatises |
Soggetto topico |
Dynamics
Geometry, Differential |
Soggetto genere / forma | Electronic books. |
ISBN |
1-282-44268-6
9786612442681 981-4277-15-0 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Preface; Acknowledgments; Contents; List of Figures; List of Examples; Dynamical Systems; 1. Differential Equations; 1.1 Galileo's pendulum; 1.2 D'Alembert transformation; 1.3 From differential equations to dynamical systems; 2. Dynamical Systems; 2.1 State space - phase space; 2.2 Definition; 2.3 Existence and uniqueness; 2.4 Flow, fixed points and null-clines; 2.5 Stability theorems; 2.5.1 Linearized system; 2.5.2 Hartman-Grobman linearization theorem; 2.5.3 Liapouno. stability theorem; 2.6 Phase portraits of dynamical systems; 2.6.1 Two-dimensional systems; 2.6.2 Three-dimensional systems
2.7 Various types of dynamical systems2.7.1 Linear and nonlinear dynamical systems; 2.7.2 Homogeneous dynamical systems; 2.7.3 Polynomial dynamical systems; 2.7.4 Singularly perturbed systems; 2.7.5 Slow-Fast dynamical systems; 2.8 Two-dimensional dynamical systems; 2.8.1 Poincare index; 2.8.2 Poincare contact theory; 2.8.3 Poincare limit cycle; 2.8.4 Poincare-Bendixson Theorem; 2.9 High-dimensional dynamical systems; 2.9.1 Attractors; 2.9.2 Strange attractors; 2.9.3 First integrals and Lie derivative; 2.10 Hamiltonian and integrable systems; 2.10.1 Hamiltonian dynamical systems 2.10.2 Integrable system2.10.3 K.A.M. Theorem; 3. Invariant Sets; 3.1 Manifold; 3.1.1 Definition; 3.1.2 Existence; 3.2 Invariant sets; 3.2.1 Global invariance; 3.2.2 Local invariance; 4. Local Bifurcations; 4.1 CenterManifold Theorem; 4.1.1 Center manifold theorem for flows; 4.1.2 Center manifold approximation; 4.1.3 Center manifold depending upon a parameter; 4.2 Normal FormTheorem.; 4.3 Local Bifurcations of Codimension 1; 4.3.1 Saddle-node bifurcation; 4.3.2 Transcritical bifurcation; 4.3.3 Pitchfork bifurcation; 4.3.4 Hopf bifurcation; 5. Slow-Fast Dynamical Systems; 5.1 Introduction 5.2 Geometric Singular Perturbation Theory5.2.1 Assumptions; 5.2.2 Invariance; 5.2.3 Slow invariant manifold; 5.3 Slow-fast dynamical systems - Singularly perturbed systems; 5.3.1 Singularly perturbed systems; 5.3.2 Slow-fast autonomous dynamical systems; 6. Integrability; 6.1 Integrability conditions, integrating factor, multiplier; 6.1.1 Two-dimensional dynamical systems; 6.1.2 Three-dimensional dynamical systems; 6.2 First integrals - Jacobi's last multiplier theorem; 6.2.1 First integrals; 6.2.2 Jacobi's last multiplier theorem; 6.3 Darboux theory of integrability 6.3.1 Algebraic particular integral - General integral6.3.2 General integral; 6.3.3 Multiplier; 6.3.4 Algebraic particular integral and fixed points; 6.3.5 Homogeneous polynomial dynamical systems of degree m; 6.3.6 Homogeneous polynomial dynamical systems of degree two; 6.3.7 Planar polynomial dynamical systems; Differential Geometry; 7. Differential Geometry; 7.1 Concept of curves - Kinematics vector functions; 7.1.1 Trajectory curve; 7.1.2 Instantaneous velocity vector; 7.1.3 Instantaneous acceleration vector; 7.2 Gram-Schmidt process - Generalized Fr ́enet moving frame 7.2.1 Gram-Schmidt process |
Record Nr. | UNINA-9910456759203321 |
Ginoux Jean-Marc | ||
New Jersey, : World Scientific, c2009 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. Federico II | ||
|
Differential geometry applied to dynamical systems [[electronic resource] /] / Jean-Marc Ginoux |
Autore | Ginoux Jean-Marc |
Pubbl/distr/stampa | New Jersey, : World Scientific, c2009 |
Descrizione fisica | 1 online resource (341 p.) |
Disciplina | 519 |
Collana | World Scientific series on nonlinear science. Series A, Monographs and treatises |
Soggetto topico |
Dynamics
Geometry, Differential |
ISBN |
1-282-44268-6
9786612442681 981-4277-15-0 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Preface; Acknowledgments; Contents; List of Figures; List of Examples; Dynamical Systems; 1. Differential Equations; 1.1 Galileo's pendulum; 1.2 D'Alembert transformation; 1.3 From differential equations to dynamical systems; 2. Dynamical Systems; 2.1 State space - phase space; 2.2 Definition; 2.3 Existence and uniqueness; 2.4 Flow, fixed points and null-clines; 2.5 Stability theorems; 2.5.1 Linearized system; 2.5.2 Hartman-Grobman linearization theorem; 2.5.3 Liapouno. stability theorem; 2.6 Phase portraits of dynamical systems; 2.6.1 Two-dimensional systems; 2.6.2 Three-dimensional systems
2.7 Various types of dynamical systems2.7.1 Linear and nonlinear dynamical systems; 2.7.2 Homogeneous dynamical systems; 2.7.3 Polynomial dynamical systems; 2.7.4 Singularly perturbed systems; 2.7.5 Slow-Fast dynamical systems; 2.8 Two-dimensional dynamical systems; 2.8.1 Poincare index; 2.8.2 Poincare contact theory; 2.8.3 Poincare limit cycle; 2.8.4 Poincare-Bendixson Theorem; 2.9 High-dimensional dynamical systems; 2.9.1 Attractors; 2.9.2 Strange attractors; 2.9.3 First integrals and Lie derivative; 2.10 Hamiltonian and integrable systems; 2.10.1 Hamiltonian dynamical systems 2.10.2 Integrable system2.10.3 K.A.M. Theorem; 3. Invariant Sets; 3.1 Manifold; 3.1.1 Definition; 3.1.2 Existence; 3.2 Invariant sets; 3.2.1 Global invariance; 3.2.2 Local invariance; 4. Local Bifurcations; 4.1 CenterManifold Theorem; 4.1.1 Center manifold theorem for flows; 4.1.2 Center manifold approximation; 4.1.3 Center manifold depending upon a parameter; 4.2 Normal FormTheorem.; 4.3 Local Bifurcations of Codimension 1; 4.3.1 Saddle-node bifurcation; 4.3.2 Transcritical bifurcation; 4.3.3 Pitchfork bifurcation; 4.3.4 Hopf bifurcation; 5. Slow-Fast Dynamical Systems; 5.1 Introduction 5.2 Geometric Singular Perturbation Theory5.2.1 Assumptions; 5.2.2 Invariance; 5.2.3 Slow invariant manifold; 5.3 Slow-fast dynamical systems - Singularly perturbed systems; 5.3.1 Singularly perturbed systems; 5.3.2 Slow-fast autonomous dynamical systems; 6. Integrability; 6.1 Integrability conditions, integrating factor, multiplier; 6.1.1 Two-dimensional dynamical systems; 6.1.2 Three-dimensional dynamical systems; 6.2 First integrals - Jacobi's last multiplier theorem; 6.2.1 First integrals; 6.2.2 Jacobi's last multiplier theorem; 6.3 Darboux theory of integrability 6.3.1 Algebraic particular integral - General integral6.3.2 General integral; 6.3.3 Multiplier; 6.3.4 Algebraic particular integral and fixed points; 6.3.5 Homogeneous polynomial dynamical systems of degree m; 6.3.6 Homogeneous polynomial dynamical systems of degree two; 6.3.7 Planar polynomial dynamical systems; Differential Geometry; 7. Differential Geometry; 7.1 Concept of curves - Kinematics vector functions; 7.1.1 Trajectory curve; 7.1.2 Instantaneous velocity vector; 7.1.3 Instantaneous acceleration vector; 7.2 Gram-Schmidt process - Generalized Fr ́enet moving frame 7.2.1 Gram-Schmidt process |
Record Nr. | UNINA-9910780810503321 |
Ginoux Jean-Marc | ||
New Jersey, : World Scientific, c2009 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. Federico II | ||
|
Differential geometry applied to dynamical systems [[electronic resource] /] / Jean-Marc Ginoux |
Autore | Ginoux Jean-Marc |
Pubbl/distr/stampa | New Jersey, : World Scientific, c2009 |
Descrizione fisica | 1 online resource (341 p.) |
Disciplina | 519 |
Collana | World Scientific series on nonlinear science. Series A, Monographs and treatises |
Soggetto topico |
Dynamics
Geometry, Differential |
ISBN |
1-282-44268-6
9786612442681 981-4277-15-0 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Preface; Acknowledgments; Contents; List of Figures; List of Examples; Dynamical Systems; 1. Differential Equations; 1.1 Galileo's pendulum; 1.2 D'Alembert transformation; 1.3 From differential equations to dynamical systems; 2. Dynamical Systems; 2.1 State space - phase space; 2.2 Definition; 2.3 Existence and uniqueness; 2.4 Flow, fixed points and null-clines; 2.5 Stability theorems; 2.5.1 Linearized system; 2.5.2 Hartman-Grobman linearization theorem; 2.5.3 Liapouno. stability theorem; 2.6 Phase portraits of dynamical systems; 2.6.1 Two-dimensional systems; 2.6.2 Three-dimensional systems
2.7 Various types of dynamical systems2.7.1 Linear and nonlinear dynamical systems; 2.7.2 Homogeneous dynamical systems; 2.7.3 Polynomial dynamical systems; 2.7.4 Singularly perturbed systems; 2.7.5 Slow-Fast dynamical systems; 2.8 Two-dimensional dynamical systems; 2.8.1 Poincare index; 2.8.2 Poincare contact theory; 2.8.3 Poincare limit cycle; 2.8.4 Poincare-Bendixson Theorem; 2.9 High-dimensional dynamical systems; 2.9.1 Attractors; 2.9.2 Strange attractors; 2.9.3 First integrals and Lie derivative; 2.10 Hamiltonian and integrable systems; 2.10.1 Hamiltonian dynamical systems 2.10.2 Integrable system2.10.3 K.A.M. Theorem; 3. Invariant Sets; 3.1 Manifold; 3.1.1 Definition; 3.1.2 Existence; 3.2 Invariant sets; 3.2.1 Global invariance; 3.2.2 Local invariance; 4. Local Bifurcations; 4.1 CenterManifold Theorem; 4.1.1 Center manifold theorem for flows; 4.1.2 Center manifold approximation; 4.1.3 Center manifold depending upon a parameter; 4.2 Normal FormTheorem.; 4.3 Local Bifurcations of Codimension 1; 4.3.1 Saddle-node bifurcation; 4.3.2 Transcritical bifurcation; 4.3.3 Pitchfork bifurcation; 4.3.4 Hopf bifurcation; 5. Slow-Fast Dynamical Systems; 5.1 Introduction 5.2 Geometric Singular Perturbation Theory5.2.1 Assumptions; 5.2.2 Invariance; 5.2.3 Slow invariant manifold; 5.3 Slow-fast dynamical systems - Singularly perturbed systems; 5.3.1 Singularly perturbed systems; 5.3.2 Slow-fast autonomous dynamical systems; 6. Integrability; 6.1 Integrability conditions, integrating factor, multiplier; 6.1.1 Two-dimensional dynamical systems; 6.1.2 Three-dimensional dynamical systems; 6.2 First integrals - Jacobi's last multiplier theorem; 6.2.1 First integrals; 6.2.2 Jacobi's last multiplier theorem; 6.3 Darboux theory of integrability 6.3.1 Algebraic particular integral - General integral6.3.2 General integral; 6.3.3 Multiplier; 6.3.4 Algebraic particular integral and fixed points; 6.3.5 Homogeneous polynomial dynamical systems of degree m; 6.3.6 Homogeneous polynomial dynamical systems of degree two; 6.3.7 Planar polynomial dynamical systems; Differential Geometry; 7. Differential Geometry; 7.1 Concept of curves - Kinematics vector functions; 7.1.1 Trajectory curve; 7.1.2 Instantaneous velocity vector; 7.1.3 Instantaneous acceleration vector; 7.2 Gram-Schmidt process - Generalized Fr ́enet moving frame 7.2.1 Gram-Schmidt process |
Record Nr. | UNINA-9910808484203321 |
Ginoux Jean-Marc | ||
New Jersey, : World Scientific, c2009 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. Federico II | ||
|
Henri Poincare : a biography through the daily papers / / Jean-Marc Ginoux, LSIS, CNRS, Universite de Toulon, France, Archives Henri Poincare, CNRS, Universite de Nancy, France, Christian Gerini, Universite du Sud Toulon Var, France & Universite Paris-11 Orsay, France |
Autore | Ginoux Jean-Marc |
Pubbl/distr/stampa | New Jersey : , : World Scientific, , [2014] |
Descrizione fisica | 1 online resource (xxii, 238 pages) : illustrations |
Disciplina | 509.2 |
Collana | Gale eBooks |
Soggetto topico |
Mathematicians - France
Physicists - France |
ISBN | 981-4556-62-9 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Foreword; Note from the translator; Preface; Acknowledgments; Contents; List of Figures; The early years; 1. The Poincare Family; 1.1 The Grandfather: Jacques-Nicolas Poincare; 1.2 The Uncle: Antoni Poincare; 1.3 The Father: Leon Poincare; 1.4 Origin of the Name Poincare; 2. Childhood and Studies; 2.1 An Almost Peaceful Golden Childhood; 2.2 Zero at the Math Test of the Baccalaureate; 2.3 "Poincarre" at The Ecole Polytechnique; 2.4 The Ecole Des Mines - The Thesis; 3. Inspector of Mines in Vesoul; The Professor and the Savant; 4. From the University of Caen to the Sorbonne
4.1 The Discovery of the Fuchsian Functions5. From the Sorbonne to the Academie; 5.1 The Discovery of a Terra Incognita; 6. The Prize of King Oscar II of Sweden and Norway; 6.1 From Success to Triumph; 6.2 A Fruitful Mistake; 6.3 A Secret Not So Well Kept; 6.4 Winning Recognition; The Universal Thinker and The Public Figure; 7. French Geodesy and the Fight over the Meridian; 7.1 The Fight over the Meridian; 7.2 The Geodesic Mission and the French Geodesy; 8. The Controversy over the Rotation of the Earth; 8.1 The Origin of the Controversy; 8.2 Moving the Foucault Pendulum to the Pantheon 8.3 Science and Hypothesis8.4 The Skeptical Polytechnician; 8.5 Mach's Mechanics; 8.6 Does the Earth Rotate?; 9. The Philosophical Work and its Impact; 9.1 Science and Hypothesis: "Latin without Crying or Greek without Tears"; 9.2 The Value of Science. The "Strangest Interpretations"; 9.3 Science and Method: The "Granitic Rationalism"; 9.4 Last Essays: "A Certain Embarrassment"; 9.5 Poincarism, Opportunism, Commodism, etc; The Committed Man; 10. The Dreyfus Affair; 10.1 The First Dreyfus Affair: A Brief Overview; 10.2 Three Other Trials 10.3 The Second Dreyfus Affair: The Rennes Trial and the Intervention of Mathematicians10.4 The Third Trial: "Wise Men in a Shed"; 11. The Role Model - The Immortal; 11.1 Poincare and the End of the World; 11.2 Poincare and Science in the Twentieth Century; 11.3 Poincare and the Martingale Strategy; 11.4 Poincare Cited as a Role Model; 11.5 Poincare at the Academie Francaise; 11.6 The Price of Immortality; 11.7 The Reception at the Academy; 12. Last Commitments, Last Works; 12.1 The Press and Poincare's Lectures at the Faculty of Science; 12.2 Defense of the Humanities; 12.3 The New Mechanics 12.4 An Educational Commitment: "What Things Say"13. To Conclude: the Poet of Mathematics; Bibliography; Name Index; Subject Index |
Record Nr. | UNINA-9910790869203321 |
Ginoux Jean-Marc | ||
New Jersey : , : World Scientific, , [2014] | ||
Materiale a stampa | ||
Lo trovi qui: Univ. Federico II | ||
|
Henri Poincare : a biography through the daily papers / / Jean-Marc Ginoux, LSIS, CNRS, Universite de Toulon, France, Archives Henri Poincare, CNRS, Universite de Nancy, France, Christian Gerini, Universite du Sud Toulon Var, France & Universite Paris-11 Orsay, France |
Autore | Ginoux Jean-Marc |
Pubbl/distr/stampa | New Jersey : , : World Scientific, , [2014] |
Descrizione fisica | 1 online resource (xxii, 238 pages) : illustrations |
Disciplina | 509.2 |
Collana | Gale eBooks |
Soggetto topico |
Mathematicians - France
Physicists - France |
ISBN | 981-4556-62-9 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Foreword; Note from the translator; Preface; Acknowledgments; Contents; List of Figures; The early years; 1. The Poincare Family; 1.1 The Grandfather: Jacques-Nicolas Poincare; 1.2 The Uncle: Antoni Poincare; 1.3 The Father: Leon Poincare; 1.4 Origin of the Name Poincare; 2. Childhood and Studies; 2.1 An Almost Peaceful Golden Childhood; 2.2 Zero at the Math Test of the Baccalaureate; 2.3 "Poincarre" at The Ecole Polytechnique; 2.4 The Ecole Des Mines - The Thesis; 3. Inspector of Mines in Vesoul; The Professor and the Savant; 4. From the University of Caen to the Sorbonne
4.1 The Discovery of the Fuchsian Functions5. From the Sorbonne to the Academie; 5.1 The Discovery of a Terra Incognita; 6. The Prize of King Oscar II of Sweden and Norway; 6.1 From Success to Triumph; 6.2 A Fruitful Mistake; 6.3 A Secret Not So Well Kept; 6.4 Winning Recognition; The Universal Thinker and The Public Figure; 7. French Geodesy and the Fight over the Meridian; 7.1 The Fight over the Meridian; 7.2 The Geodesic Mission and the French Geodesy; 8. The Controversy over the Rotation of the Earth; 8.1 The Origin of the Controversy; 8.2 Moving the Foucault Pendulum to the Pantheon 8.3 Science and Hypothesis8.4 The Skeptical Polytechnician; 8.5 Mach's Mechanics; 8.6 Does the Earth Rotate?; 9. The Philosophical Work and its Impact; 9.1 Science and Hypothesis: "Latin without Crying or Greek without Tears"; 9.2 The Value of Science. The "Strangest Interpretations"; 9.3 Science and Method: The "Granitic Rationalism"; 9.4 Last Essays: "A Certain Embarrassment"; 9.5 Poincarism, Opportunism, Commodism, etc; The Committed Man; 10. The Dreyfus Affair; 10.1 The First Dreyfus Affair: A Brief Overview; 10.2 Three Other Trials 10.3 The Second Dreyfus Affair: The Rennes Trial and the Intervention of Mathematicians10.4 The Third Trial: "Wise Men in a Shed"; 11. The Role Model - The Immortal; 11.1 Poincare and the End of the World; 11.2 Poincare and Science in the Twentieth Century; 11.3 Poincare and the Martingale Strategy; 11.4 Poincare Cited as a Role Model; 11.5 Poincare at the Academie Francaise; 11.6 The Price of Immortality; 11.7 The Reception at the Academy; 12. Last Commitments, Last Works; 12.1 The Press and Poincare's Lectures at the Faculty of Science; 12.2 Defense of the Humanities; 12.3 The New Mechanics 12.4 An Educational Commitment: "What Things Say"13. To Conclude: the Poet of Mathematics; Bibliography; Name Index; Subject Index |
Record Nr. | UNINA-9910812656103321 |
Ginoux Jean-Marc | ||
New Jersey : , : World Scientific, , [2014] | ||
Materiale a stampa | ||
Lo trovi qui: Univ. Federico II | ||
|
Henri Poincaré : a biography through the daily papers / / Jean-Marc Ginoux, LSIS, CNRS, Université de Toulon, France, Archives Henri Poincaré, CNRS, Université de Nancy, France, Christian Gerini, Université du Sud Toulon Var, France & Université Paris-11 Orsay, France |
Autore | Ginoux Jean-Marc |
Pubbl/distr/stampa | New Jersey : , : World Scientific, , [2014] |
Descrizione fisica | 1 online resource (261 p.) |
Disciplina | 509.2 |
Altri autori (Persone) | GeriniChristian |
Soggetto topico |
Mathematicians - France
Physicists - France |
Soggetto genere / forma | Electronic books. |
ISBN | 981-4556-62-9 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Foreword; Note from the translator; Preface; Acknowledgments; Contents; List of Figures; The early years; 1. The Poincare Family; 1.1 The Grandfather: Jacques-Nicolas Poincare; 1.2 The Uncle: Antoni Poincare; 1.3 The Father: Leon Poincare; 1.4 Origin of the Name Poincare; 2. Childhood and Studies; 2.1 An Almost Peaceful Golden Childhood; 2.2 Zero at the Math Test of the Baccalaureate; 2.3 "Poincarre" at The Ecole Polytechnique; 2.4 The Ecole Des Mines - The Thesis; 3. Inspector of Mines in Vesoul; The Professor and the Savant; 4. From the University of Caen to the Sorbonne
4.1 The Discovery of the Fuchsian Functions5. From the Sorbonne to the Academie; 5.1 The Discovery of a Terra Incognita; 6. The Prize of King Oscar II of Sweden and Norway; 6.1 From Success to Triumph; 6.2 A Fruitful Mistake; 6.3 A Secret Not So Well Kept; 6.4 Winning Recognition; The Universal Thinker and The Public Figure; 7. French Geodesy and the Fight over the Meridian; 7.1 The Fight over the Meridian; 7.2 The Geodesic Mission and the French Geodesy; 8. The Controversy over the Rotation of the Earth; 8.1 The Origin of the Controversy; 8.2 Moving the Foucault Pendulum to the Pantheon 8.3 Science and Hypothesis8.4 The Skeptical Polytechnician; 8.5 Mach's Mechanics; 8.6 Does the Earth Rotate?; 9. The Philosophical Work and its Impact; 9.1 Science and Hypothesis: "Latin without Crying or Greek without Tears"; 9.2 The Value of Science. The "Strangest Interpretations"; 9.3 Science and Method: The "Granitic Rationalism"; 9.4 Last Essays: "A Certain Embarrassment"; 9.5 Poincarism, Opportunism, Commodism, etc; The Committed Man; 10. The Dreyfus Affair; 10.1 The First Dreyfus Affair: A Brief Overview; 10.2 Three Other Trials 10.3 The Second Dreyfus Affair: The Rennes Trial and the Intervention of Mathematicians10.4 The Third Trial: "Wise Men in a Shed"; 11. The Role Model - The Immortal; 11.1 Poincare and the End of the World; 11.2 Poincare and Science in the Twentieth Century; 11.3 Poincare and the Martingale Strategy; 11.4 Poincare Cited as a Role Model; 11.5 Poincare at the Academie Francaise; 11.6 The Price of Immortality; 11.7 The Reception at the Academy; 12. Last Commitments, Last Works; 12.1 The Press and Poincare's Lectures at the Faculty of Science; 12.2 Defense of the Humanities; 12.3 The New Mechanics 12.4 An Educational Commitment: "What Things Say"13. To Conclude: the Poet of Mathematics; Bibliography; Name Index; Subject Index |
Record Nr. | UNINA-9910453249803321 |
Ginoux Jean-Marc | ||
New Jersey : , : World Scientific, , [2014] | ||
Materiale a stampa | ||
Lo trovi qui: Univ. Federico II | ||
|
History of Nonlinear Oscillations Theory in France (1880-1940) [[electronic resource] /] / by Jean-Marc Ginoux |
Autore | Ginoux Jean-Marc |
Edizione | [1st ed. 2017.] |
Pubbl/distr/stampa | Cham : , : Springer International Publishing : , : Imprint : Springer, , 2017 |
Descrizione fisica | 1 online resource (XXXVII, 381 p. 117 illus., 44 illus. in color.) |
Disciplina | 620.0042 |
Collana | Archimedes, New Studies in the History and Philosophy of Science and Technology |
Soggetto topico |
Engineering design
Science—Philosophy Science—History Mathematics History Engineering Design Philosophical and Historical Foundations of Science History of Mathematical Sciences |
ISBN | 3-319-55239-2 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto | Part I. From sustained oscillations to relaxation oscillations -- Chapter 1. From the series-dynamo machine to the singing arc -- Chapter 2. The Great War and the first triode designs -- Chapter 3. Van der Pol’s prototype equation -- Part II. From relaxation oscillations to self-oscillations -- Chapter 4. Van der Pol’s lectures -- Chapter 5. Andronov’s notes -- Chapter 6. Response to Van der Pol’s and Andronov’s work in France -- Chapter 7. The first International Conference on Nonlinear processes: Paris 1933 -- Chapter 8. The paradigm of relaxation oscillations in France -- Part III. From self-oscillations to quasi-periodic oscillations -- Chapter 9. The Poincaré-Lindstedt method -- Chapter 10. Van der Pol’s method -- Chapter 11. The Krylov-Bogolyubov method -- Chapter 12. The Mandelstam-Papeleksi School -- Chapter 13. From quasi-periodic functions to recurrent motions -- Chapter 14. Hadamard and his seminary. |
Record Nr. | UNINA-9910254338103321 |
Ginoux Jean-Marc | ||
Cham : , : Springer International Publishing : , : Imprint : Springer, , 2017 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. Federico II | ||
|
Poincaré, Einstein and the Discovery of Special Relativity [[electronic resource] ] : An End to the Controversy / / by Jean-Marc Ginoux |
Autore | Ginoux Jean-Marc |
Edizione | [1st ed. 2024.] |
Pubbl/distr/stampa | Cham : , : Springer Nature Switzerland : , : Imprint : Springer, , 2024 |
Descrizione fisica | 1 online resource (150 pages) |
Disciplina | 530.11 |
Collana | History of Physics |
Soggetto topico |
Physics - History
Special relativity (Physics) Science - History History of Physics and Astronomy Special Relativity History of Science |
ISBN | 3-031-51387-8 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto | Introduction -- From Luminiferous Ether to the Earth's Motion -- Principle of Relativity -- Towards a New Transformation -- Poincaré's New Mechanics -- Poincaré's Note and Memoir -- Einstein's Article of 1905 -- Poincaré's Hypothesis and Results vs. Einstein's -- The Reception of the Special Relativity in Europe -- The Race for the Nobel Prize -- Conclusion. |
Record Nr. | UNINA-9910847585403321 |
Ginoux Jean-Marc | ||
Cham : , : Springer Nature Switzerland : , : Imprint : Springer, , 2024 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. Federico II | ||
|