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Biblioteca

MARC Lista (tabellare)
4.1: Mécanique : généralités, historique / sous la direction scientifique de Paul Appell
4.1: Mécanique : généralités, historique / sous la direction scientifique de Paul Appell
Pubbl/distr/stampa Sceaux, : J. Gabay, [1991]
Descrizione fisica 292 col. ; 18 x 25 cm
Disciplina 510
531.01515
Soggetto topico Matematica - Enciclopedie e dizionari
Meccanica analitica
ISBN 2876471140
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione fre
Record Nr. UNISANNIO-NAP0409722
Sceaux, : J. Gabay, [1991]
Materiale a stampa
Lo trovi qui: Univ. del Sannio
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An introduction to mathematical modeling : a course in mechanics / J. Tinsley Oden
An introduction to mathematical modeling : a course in mechanics / J. Tinsley Oden
Autore ODEN, John Tinsley <1936->
Pubbl/distr/stampa Hoboken, N.J., : Wiley, 2011
Descrizione fisica Testo elettronico (PDF) (XIV, 350 p.)
Disciplina 531.01515
Collana Wiley series in computational mechanics
Soggetto topico Meccanica analitica
ISBN 9781118105733
Formato Risorse elettroniche
Livello bibliografico Monografia
Lingua di pubblicazione eng
Record Nr. UNISA-996448452003316
ODEN, John Tinsley <1936->  
Hoboken, N.J., : Wiley, 2011
Risorse elettroniche
Lo trovi qui: Univ. di Salerno
Opac: Controlla la disponibilità qui
Analytical Mechanics [[electronic resource] /] / by Carl S. Helrich
Analytical Mechanics [[electronic resource] /] / by Carl S. Helrich
Autore Helrich Carl S
Edizione [1st ed. 2017.]
Pubbl/distr/stampa Cham : , : Springer International Publishing : , : Imprint : Springer, , 2017
Descrizione fisica 1 online resource (XV, 349 p. 58 illus.)
Disciplina 531.01515
Collana Undergraduate Lecture Notes in Physics
Soggetto topico Mechanics
Physics
Mechanics, Applied
Classical Mechanics
Mathematical Methods in Physics
Theoretical and Applied Mechanics
ISBN 3-319-44491-3
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto History -- Lagrangian Mechanics -- Hamiltonian Mechanics -- Solid Bodies -- Hamilton-Jacobi Approach -- Complex Systems -- Chaos in Dynamical Systems -- Special Relativity -- Appendices -- Differential of S -- Hamilton-Jacobi Equation -- With Variables p, q, q -- Zero-Component Lemma -- Maxwell Equations from Field Strength Tensor -- Differential Operators -- Answers to Selected Exercises.       .
Record Nr. UNINA-9910254597703321
Helrich Carl S  
Cham : , : Springer International Publishing : , : Imprint : Springer, , 2017
Materiale a stampa
Lo trovi qui: Univ. Federico II
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Analytical Mechanics [[electronic resource] ] : Classical, Lagrangian and Hamiltonian Mechanics, Stability Theory, Special Relativity / / by Valter Moretti
Analytical Mechanics [[electronic resource] ] : Classical, Lagrangian and Hamiltonian Mechanics, Stability Theory, Special Relativity / / by Valter Moretti
Autore Moretti Valter
Edizione [1st ed. 2023.]
Pubbl/distr/stampa Cham : , : Springer Nature Switzerland : , : Imprint : Springer, , 2023
Descrizione fisica 1 online resource (848 pages)
Disciplina 531.01515
Collana La Matematica per il 3+2
Soggetto topico Mathematics
Mechanics, Applied
Mechanics
Mathematical physics
Engineering Mechanics
Classical Mechanics
Theoretical, Mathematical and Computational Physics
Mecànica analítica
Soggetto genere / forma Llibres electrònics
Soggetto non controllato Mathematics
ISBN 3-031-27612-4
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto 1 The Space and Time of Classical Physics -- 2 The Spacetime of Classical Physics and Classical Kinematics -- 3 Newtonian dynamics: a conceptual critical review -- 4 Balance equations and first integrals in Mechanics -- 5 Introduction to Rigid Body Mechanics -- 6 Introduction to stability theory with applications to Mechanics -- 7 Foundations of Lagrangian Mechanics -- 8 Symmetries and conservation laws in Lagrangian Mechanics -- 9 Advanced topics in Lagrangian Mechanics -- 10 Mathematical introduction to Special Relativity and the relativistic Lagrangian formulation -- 11 Fundamentals of Hamiltonian Mechanic -- 12 Canonical Hamiltonian theory, Hamiltonian symmetries and Hamilton-Jacobi theory -- 13 Hamiltonian symplectic structures: an introduction -- 14 Complement: elements of the theory of ordinary differential equations -- 15 Complement: the physical principles at the foundations of Special Relativity -- Appendix A: elements of Topology, Analysis, Linear Algebra and Geometry -- Appendix B: advanced topics in Differential Geometry -- Appendix C: Solutions and/or hints to suggested exercises.
Record Nr. UNINA-9910734832003321
Moretti Valter  
Cham : , : Springer Nature Switzerland : , : Imprint : Springer, , 2023
Materiale a stampa
Lo trovi qui: Univ. Federico II
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Analytical mechanics for relativity and quantum mechanics [[electronic resource] /] / Oliver Davis Johns
Analytical mechanics for relativity and quantum mechanics [[electronic resource] /] / Oliver Davis Johns
Autore Johns Oliver Davis
Pubbl/distr/stampa Oxford, : Oxford University Press, 2005
Descrizione fisica 1 online resource (618 p.)
Disciplina 530.11
531.01515
Collana Oxford Graduate Texts
Soggetto topico Mechanics, Analytic
Quantum theory
Soggetto genere / forma Electronic books.
ISBN 0-19-152429-8
1-282-36571-1
1-4356-0925-5
9786612365713
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto Contents; Dedication; Preface; Acknowledgments; PART I: INTRODUCTION: THE TRADITIONAL THEORY; 1 Basic Dynamics of Point Particles and Collections; 1.1 Newton's Space and Time; 1.2 Single Point Particle; 1.3 Collective Variables; 1.4 The Law of Momentum for Collections; 1.5 The Law of Angular Momentum for Collections; 1.6 "Derivations" of the Axioms; 1.7 The Work-Energy Theorem for Collections; 1.8 Potential and Total Energy for Collections; 1.9 The Center of Mass; 1.10 Center of Mass and Momentum; 1.11 Center of Mass and Angular Momentum; 1.12 Center of Mass and Torque
1.13 Change of Angular Momentum1.14 Center of Mass and the Work-Energy Theorems; 1.15 Center of Mass as a Point Particle; 1.16 Special Results for Rigid Bodies; 1.17 Exercises; 2 Introduction to Lagrangian Mechanics; 2.1 Configuration Space; 2.2 Newton's Second Law in Lagrangian Form; 2.3 A Simple Example; 2.4 Arbitrary Generalized Coordinates; 2.5 Generalized Velocities in the q-System; 2.6 Generalized Forces in the q-System; 2.7 The Lagrangian Expressed in the q-System; 2.8 Two Important Identities; 2.9 Invariance of the Lagrange Equations; 2.10 Relation Between Any Two Systems
2.11 More of the Simple Example2.12 Generalized Momenta in the q-System; 2.13 Ignorable Coordinates; 2.14 Some Remarks About Units; 2.15 The Generalized Energy Function; 2.16 The Generalized Energy and the Total Energy; 2.17 Velocity Dependent Potentials; 2.18 Exercises; 3 Lagrangian Theory of Constraints; 3.1 Constraints Defined; 3.2 Virtual Displacement; 3.3 Virtual Work; 3.4 Form of the Forces of Constraint; 3.5 General Lagrange Equations with Constraints; 3.6 An Alternate Notation for Holonomic Constraints; 3.7 Example of the General Method; 3.8 Reduction of Degrees of Freedom
3.9 Example of a Reduction3.10 Example of a Simpler Reduction Method; 3.11 Recovery of the Forces of Constraint; 3.12 Example of a Recovery; 3.13 Generalized Energy Theorem with Constraints; 3.14 Tractable Non-Holonomic Constraints; 3.15 Exercises; 4 Introduction to Hamiltonian Mechanics; 4.1 Phase Space; 4.2 Hamilton Equations; 4.3 An Example of the Hamilton Equations; 4.4 Non-Potential and Constraint Forces; 4.5 Reduced Hamiltonian; 4.6 Poisson Brackets; 4.7 The Schroedinger Equation; 4.8 The Ehrenfest Theorem; 4.9 Exercises; 5 The Calculus of Variations; 5.1 Paths in an N-Dimensional Space
5.2 Variations of Coordinates5.3 Variations of Functions; 5.4 Variation of a Line Integral; 5.5 Finding Extremum Paths; 5.6 Example of an Extremum Path Calculation; 5.7 Invariance and Homogeneity; 5.8 The Brachistochrone Problem; 5.9 Calculus of Variations with Constraints; 5.10 An Example with Constraints; 5.11 Reduction of Degrees of Freedom; 5.12 Example of a Reduction; 5.13 Example of a Better Reduction; 5.14 The Coordinate Parametric Method; 5.15 Comparison of the Methods; 5.16 Exercises; 6 Hamilton's Principle; 6.1 Hamilton's Principle in Lagrangian Form
6.2 Hamilton's Principle with Constraints
Record Nr. UNINA-9910465790403321
Johns Oliver Davis  
Oxford, : Oxford University Press, 2005
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Analytical mechanics for relativity and quantum mechanics [[electronic resource] /] / Oliver Davis Johns
Analytical mechanics for relativity and quantum mechanics [[electronic resource] /] / Oliver Davis Johns
Autore Johns Oliver Davis
Pubbl/distr/stampa Oxford, : Oxford University Press, 2005
Descrizione fisica 1 online resource (618 p.)
Disciplina 530.11
531.01515
Collana Oxford Graduate Texts
Soggetto topico Mechanics, Analytic
Quantum theory
ISBN 0-19-152429-8
1-282-36571-1
1-4356-0925-5
9786612365713
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto Contents; Dedication; Preface; Acknowledgments; PART I: INTRODUCTION: THE TRADITIONAL THEORY; 1 Basic Dynamics of Point Particles and Collections; 1.1 Newton's Space and Time; 1.2 Single Point Particle; 1.3 Collective Variables; 1.4 The Law of Momentum for Collections; 1.5 The Law of Angular Momentum for Collections; 1.6 "Derivations" of the Axioms; 1.7 The Work-Energy Theorem for Collections; 1.8 Potential and Total Energy for Collections; 1.9 The Center of Mass; 1.10 Center of Mass and Momentum; 1.11 Center of Mass and Angular Momentum; 1.12 Center of Mass and Torque
1.13 Change of Angular Momentum1.14 Center of Mass and the Work-Energy Theorems; 1.15 Center of Mass as a Point Particle; 1.16 Special Results for Rigid Bodies; 1.17 Exercises; 2 Introduction to Lagrangian Mechanics; 2.1 Configuration Space; 2.2 Newton's Second Law in Lagrangian Form; 2.3 A Simple Example; 2.4 Arbitrary Generalized Coordinates; 2.5 Generalized Velocities in the q-System; 2.6 Generalized Forces in the q-System; 2.7 The Lagrangian Expressed in the q-System; 2.8 Two Important Identities; 2.9 Invariance of the Lagrange Equations; 2.10 Relation Between Any Two Systems
2.11 More of the Simple Example2.12 Generalized Momenta in the q-System; 2.13 Ignorable Coordinates; 2.14 Some Remarks About Units; 2.15 The Generalized Energy Function; 2.16 The Generalized Energy and the Total Energy; 2.17 Velocity Dependent Potentials; 2.18 Exercises; 3 Lagrangian Theory of Constraints; 3.1 Constraints Defined; 3.2 Virtual Displacement; 3.3 Virtual Work; 3.4 Form of the Forces of Constraint; 3.5 General Lagrange Equations with Constraints; 3.6 An Alternate Notation for Holonomic Constraints; 3.7 Example of the General Method; 3.8 Reduction of Degrees of Freedom
3.9 Example of a Reduction3.10 Example of a Simpler Reduction Method; 3.11 Recovery of the Forces of Constraint; 3.12 Example of a Recovery; 3.13 Generalized Energy Theorem with Constraints; 3.14 Tractable Non-Holonomic Constraints; 3.15 Exercises; 4 Introduction to Hamiltonian Mechanics; 4.1 Phase Space; 4.2 Hamilton Equations; 4.3 An Example of the Hamilton Equations; 4.4 Non-Potential and Constraint Forces; 4.5 Reduced Hamiltonian; 4.6 Poisson Brackets; 4.7 The Schroedinger Equation; 4.8 The Ehrenfest Theorem; 4.9 Exercises; 5 The Calculus of Variations; 5.1 Paths in an N-Dimensional Space
5.2 Variations of Coordinates5.3 Variations of Functions; 5.4 Variation of a Line Integral; 5.5 Finding Extremum Paths; 5.6 Example of an Extremum Path Calculation; 5.7 Invariance and Homogeneity; 5.8 The Brachistochrone Problem; 5.9 Calculus of Variations with Constraints; 5.10 An Example with Constraints; 5.11 Reduction of Degrees of Freedom; 5.12 Example of a Reduction; 5.13 Example of a Better Reduction; 5.14 The Coordinate Parametric Method; 5.15 Comparison of the Methods; 5.16 Exercises; 6 Hamilton's Principle; 6.1 Hamilton's Principle in Lagrangian Form
6.2 Hamilton's Principle with Constraints
Record Nr. UNINA-9910792248503321
Johns Oliver Davis  
Oxford, : Oxford University Press, 2005
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Analytical mechanics for relativity and quantum mechanics [[electronic resource] /] / Oliver Davis Johns
Analytical mechanics for relativity and quantum mechanics [[electronic resource] /] / Oliver Davis Johns
Autore Johns Oliver Davis
Pubbl/distr/stampa Oxford, : Oxford University Press, 2005
Descrizione fisica 1 online resource (618 p.)
Disciplina 530.11
531.01515
Collana Oxford Graduate Texts
Soggetto topico Mechanics, Analytic
Quantum theory
ISBN 0-19-152429-8
1-282-36571-1
1-4356-0925-5
9786612365713
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto Contents; Dedication; Preface; Acknowledgments; PART I: INTRODUCTION: THE TRADITIONAL THEORY; 1 Basic Dynamics of Point Particles and Collections; 1.1 Newton's Space and Time; 1.2 Single Point Particle; 1.3 Collective Variables; 1.4 The Law of Momentum for Collections; 1.5 The Law of Angular Momentum for Collections; 1.6 "Derivations" of the Axioms; 1.7 The Work-Energy Theorem for Collections; 1.8 Potential and Total Energy for Collections; 1.9 The Center of Mass; 1.10 Center of Mass and Momentum; 1.11 Center of Mass and Angular Momentum; 1.12 Center of Mass and Torque
1.13 Change of Angular Momentum1.14 Center of Mass and the Work-Energy Theorems; 1.15 Center of Mass as a Point Particle; 1.16 Special Results for Rigid Bodies; 1.17 Exercises; 2 Introduction to Lagrangian Mechanics; 2.1 Configuration Space; 2.2 Newton's Second Law in Lagrangian Form; 2.3 A Simple Example; 2.4 Arbitrary Generalized Coordinates; 2.5 Generalized Velocities in the q-System; 2.6 Generalized Forces in the q-System; 2.7 The Lagrangian Expressed in the q-System; 2.8 Two Important Identities; 2.9 Invariance of the Lagrange Equations; 2.10 Relation Between Any Two Systems
2.11 More of the Simple Example2.12 Generalized Momenta in the q-System; 2.13 Ignorable Coordinates; 2.14 Some Remarks About Units; 2.15 The Generalized Energy Function; 2.16 The Generalized Energy and the Total Energy; 2.17 Velocity Dependent Potentials; 2.18 Exercises; 3 Lagrangian Theory of Constraints; 3.1 Constraints Defined; 3.2 Virtual Displacement; 3.3 Virtual Work; 3.4 Form of the Forces of Constraint; 3.5 General Lagrange Equations with Constraints; 3.6 An Alternate Notation for Holonomic Constraints; 3.7 Example of the General Method; 3.8 Reduction of Degrees of Freedom
3.9 Example of a Reduction3.10 Example of a Simpler Reduction Method; 3.11 Recovery of the Forces of Constraint; 3.12 Example of a Recovery; 3.13 Generalized Energy Theorem with Constraints; 3.14 Tractable Non-Holonomic Constraints; 3.15 Exercises; 4 Introduction to Hamiltonian Mechanics; 4.1 Phase Space; 4.2 Hamilton Equations; 4.3 An Example of the Hamilton Equations; 4.4 Non-Potential and Constraint Forces; 4.5 Reduced Hamiltonian; 4.6 Poisson Brackets; 4.7 The Schroedinger Equation; 4.8 The Ehrenfest Theorem; 4.9 Exercises; 5 The Calculus of Variations; 5.1 Paths in an N-Dimensional Space
5.2 Variations of Coordinates5.3 Variations of Functions; 5.4 Variation of a Line Integral; 5.5 Finding Extremum Paths; 5.6 Example of an Extremum Path Calculation; 5.7 Invariance and Homogeneity; 5.8 The Brachistochrone Problem; 5.9 Calculus of Variations with Constraints; 5.10 An Example with Constraints; 5.11 Reduction of Degrees of Freedom; 5.12 Example of a Reduction; 5.13 Example of a Better Reduction; 5.14 The Coordinate Parametric Method; 5.15 Comparison of the Methods; 5.16 Exercises; 6 Hamilton's Principle; 6.1 Hamilton's Principle in Lagrangian Form
6.2 Hamilton's Principle with Constraints
Record Nr. UNINA-9910813336103321
Johns Oliver Davis  
Oxford, : Oxford University Press, 2005
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Analytical mechanics for relativity and quantum mechanics / Oliver Davis Johns
Analytical mechanics for relativity and quantum mechanics / Oliver Davis Johns
Autore Johns, Oliver Davis
Pubbl/distr/stampa Oxford ; New York : Oxford University Press, 2005
Descrizione fisica xx, 597 p. : ill. ; 25 cm
Disciplina 531.01515
Collana Oxford graduate texts
Soggetto topico Mechanics, Analytic
ISBN 019856726X
Classificazione AMS 70-01
LC QA808.5.J64
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Record Nr. UNISALENTO-991001382939707536
Johns, Oliver Davis  
Oxford ; New York : Oxford University Press, 2005
Materiale a stampa
Lo trovi qui: Univ. del Salento
Opac: Controlla la disponibilità qui
Classical mechanics / Tom W.B. Kibble, Frank H. Berkshire
Classical mechanics / Tom W.B. Kibble, Frank H. Berkshire
Autore Kibble, T. W. B.
Edizione [5. ed.]
Pubbl/distr/stampa River Edge, NJ : Imperial College Press, 2004
Descrizione fisica xx, 478 p. : ill. ; 23 cm
Disciplina 531.01515
Altri autori (Persone) Berkshire, Frank H.
Soggetto topico Mechanics, Analytic
ISBN 1860944248 (hbk. : alk. paper)
1860944248 (alk. paper)
1860944353 (pbk. : alk paper)
Classificazione LC QA805
53.1.3
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Record Nr. UNISALENTO-991001775989707536
Kibble, T. W. B.  
River Edge, NJ : Imperial College Press, 2004
Materiale a stampa
Lo trovi qui: Univ. del Salento
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Computational Mechanics : international conference on computational methods in nonlinear mechanics, Austin, Texas, 1974 / edited by J. T. Oden
Computational Mechanics : international conference on computational methods in nonlinear mechanics, Austin, Texas, 1974 / edited by J. T. Oden
Autore International conference on computational methods in nonlinear mechanics : <1974
Pubbl/distr/stampa Berlin [etc.] : Springer, 1975
Descrizione fisica VI, 328 p. ; 25 cm.
Disciplina 531.01515
Collana Lecture notes in mathematics
Soggetto topico Meccanica analitica - Congressi
ISBN 3-540-07169-5
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Record Nr. UNIBAS-000014775
International conference on computational methods in nonlinear mechanics : <1974  
Berlin [etc.] : Springer, 1975
Materiale a stampa
Lo trovi qui: Univ. della Basilicata
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