Differential Geometry and Mathematical Physics: Part I. Manifolds, Lie Groups and Hamiltonian Systems

Cover, OCR, Vector, Bookmarked, Paginated Provides profound yet compact knowledge in manifolds, tensor fields, differential forms, Lie groups, G-manifolds and symplectic algebra and geometry for theoretical physicists Prepares the reader to access the research literature in Hamiltonian mechanics and related areas Complete account to Marsden-Weinstein reduction, including the singular case Detailed examples for all methods Starting from an undergraduate level, this book systematically develops the basics of • Calculus on manifolds, vector bundles, vector fields and differential forms, • Lie groups and Lie group actions, • Linear symplectic algebra and symplectic geometry, • Hamiltonian systems, symmetries and reduction, integrable systems and Hamilton-Jacobi theory. The topics listed under the first item are relevant for virtually all areas of mathematical physics. The second and third items constitute the link between abstract calculus and the theory of Hamiltonian systems. The last item provides an introduction to various aspects of this theory, including Morse families, the Maslov class and caustics. The book guides the reader from elementary differential geometry to advanced topics in the theory of Hamiltonian systems with the aim of making current research literature accessible. The style is that of a mathematical textbook,with full proofs given in the text or as exercises. The material is illustrated by numerous detailed examples, some of which are taken up several times for demonstrating how the methods evolve and interact. Content Level » Research Keywords » Analysis on Manifolds - Differential Geometry Applied - Hamilton-Jacobi Theory - Hamiltonian Systems - Integrable Systems - Lie Groups Applied - Manifold - Symmetries and Reduction - Symplectic Geometry - Symplectic Reduction Related subjects » Algebra - Analysis - Classical Continuum Physics - Geometry & Topology - Theoretical, Mathematical & Computational Physics