Muniz Oliva, Waldyr.
Geometric Mechanics [electronic resource] / by Waldyr Muniz Oliva. - Berlin, Heidelberg : Springer Berlin Heidelberg, 2002. - XII, 276 p. online resource. - Lecture Notes in Mathematics, 1798 1617-9692 ; . - Lecture Notes in Mathematics, 1798 .
Introduction -- Differentiable manifolds -- Vector fields, differential forms and tensor fields -- Pseudo-riemannian manifolds -- Newtonian mechanics -- Mechanical systems on riemannian manifolds -- Mechanical Systems with non-holonomic constraints -- Hyperbolicity and Anosov systems -- Vakonomic mechanics -- Special relativity -- General relativity -- Appendix A: Hamiltonian and Lagrangian formalism -- Appendix B: Möbius transformations and the Lorentz group -- Appendix C: Quasi-Maxwell equations -- Appendix D: Viscosity solutions and Aubry-Mather theory.
Geometric Mechanics here means mechanics on a pseudo-riemannian manifold and the main goal is the study of some mechanical models and concepts, with emphasis on the intrinsic and geometric aspects arising in classical problems. The first seven chapters are written in the spirit of Newtonian Mechanics while the last two ones as well as two of the four appendices describe the foundations and some aspects of Special and General Relativity. All the material has a coordinate free presentation but, for the sake of motivation, many examples and exercises are included in order to exhibit the desirable flavor of physical applications.
9783540457954
10.1007/b84214 doi
Physics.
Differentiable dynamical systems.
Mathematical physics.
Physics.
Mathematical and Computational Physics.
Dynamical Systems and Ergodic Theory.
QC19.2-20.85
530.1
Geometric Mechanics [electronic resource] / by Waldyr Muniz Oliva. - Berlin, Heidelberg : Springer Berlin Heidelberg, 2002. - XII, 276 p. online resource. - Lecture Notes in Mathematics, 1798 1617-9692 ; . - Lecture Notes in Mathematics, 1798 .
Introduction -- Differentiable manifolds -- Vector fields, differential forms and tensor fields -- Pseudo-riemannian manifolds -- Newtonian mechanics -- Mechanical systems on riemannian manifolds -- Mechanical Systems with non-holonomic constraints -- Hyperbolicity and Anosov systems -- Vakonomic mechanics -- Special relativity -- General relativity -- Appendix A: Hamiltonian and Lagrangian formalism -- Appendix B: Möbius transformations and the Lorentz group -- Appendix C: Quasi-Maxwell equations -- Appendix D: Viscosity solutions and Aubry-Mather theory.
Geometric Mechanics here means mechanics on a pseudo-riemannian manifold and the main goal is the study of some mechanical models and concepts, with emphasis on the intrinsic and geometric aspects arising in classical problems. The first seven chapters are written in the spirit of Newtonian Mechanics while the last two ones as well as two of the four appendices describe the foundations and some aspects of Special and General Relativity. All the material has a coordinate free presentation but, for the sake of motivation, many examples and exercises are included in order to exhibit the desirable flavor of physical applications.
9783540457954
10.1007/b84214 doi
Physics.
Differentiable dynamical systems.
Mathematical physics.
Physics.
Mathematical and Computational Physics.
Dynamical Systems and Ergodic Theory.
QC19.2-20.85
530.1