Analytical Mechanics

This textbook aims at introducing readers, primarily students enrolled in undergraduate Mathematics or Physics courses, to the topics and methods of classical Mathematical Physics, including Classical Mechanics, its Lagrangian and Hamiltonian formulations, Lyapunov stability, plus the Liouville theorem and the Poincaré recurrence theorem among others. The material also rigorously covers the theory of Special Relativity. The logical-mathematical structure of the physical theories of concern is introduced in an axiomatic way, starting from a limited number of physical assumptions. Special attention is paid to themes with a major impact on Theoretical and Mathematical Physics beyond Analytical Mechanics, such as the Galilean symmetry of classical Dynamics and the Poincaré symmetry of relativistic Dynamics, the far-fetching relationship between symmetries and constants of motion, the coordinate-free nature of the underpinning mathematical objects, or the possibility of describing Dynamics in a global way while still working in local coordinates. Based on the author's established teaching experience, the text was conceived to be flexible and thus adapt to different curricula and to the needs of a wide range of students and instructors.

Textbook is flexible and adapts to different curricula Contains both physical motivations and abstract formalism Classical analytical mechanics is viewed from the perspective of modern physics

Auteur
Valter Moretti is Full Professor of Mathematical Physics at University of Trento (Italy) and currently head of the doctoral school in mathematics. He is the coordinator of the research group in mathematical physics and of the local research group on quantum and quantum relativistic theories at Trento Institute for Fundamental Physics and Applications, within the Italian National Institute for Nuclear Physics. He is author/co-author of several books on quantum and quantum relativistic theories and has published over 70 papers in international journals on the subject, including quantum information. He is co-owner of an international patent on quantum technologies. He is member of the managing board of the interdepartmental Laboratory Quantum@TN on quantum sciences and technologies.

Texte du rabat

This textbook aims at introducing readers, primarily students enrolled in undergraduate Mathematics or Physics courses, to the topics and methods of classical Mathematical Physics, including Classical Mechanics, its Lagrangian and Hamiltonian formulations, Lyapunov stability, plus the Liouville theorem and the Poincaré recurrence theorem among others. The material also rigorously covers the theory of Special Relativity. The logical-mathematical structure of the physical theories of concern is introduced in an axiomatic way, starting from a limited number of physical assumptions. Special attention is paid to themes with a major impact on Theoretical and Mathematical Physics beyond Analytical Mechanics, such as the Galilean symmetry of classical Dynamics and the Poincaré symmetry of relativistic Dynamics, the far-fetching relationship between symmetries and constants of motion, the coordinate-free nature of the underpinning mathematical objects, or the possibility of describing Dynamics in a global way while still working in local coordinates. Based on the author s established teaching experience, the text was conceived to be flexible and thus adapt to different curricula and to the needs of a wide range of students and instructors.

Contenu

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.