Riemannian Geometry and Geometric Analysis
Springer International Publishing (Verlag)
978-3-319-61859-3 (ISBN)
This established reference work continues to provide its readers with a gateway to some of the most interesting developments in contemporary geometry. It offers insight into a wide range of topics, including fundamental concepts of Riemannian geometry, such as geodesics, connections and curvature; the basic models and tools of geometric analysis, such as harmonic functions, forms, mappings, eigenvalues, the Dirac operator and the heat flow method; as well as the most important variational principles of theoretical physics, such as Yang-Mills, Ginzburg-Landau or the nonlinear sigma model of quantum field theory. The present volume connects all these topics in a systematic geometric framework. At the same time, it equips the reader with the working tools of the field and enables her or him to delve into geometric research.
The 7th edition has been systematically reorganized and updated. Almost no page has been left unchanged. It also includes newmaterial, for instance on symplectic geometry, as well as the Bishop-Gromov volume growth theorem which elucidates the geometric role of Ricci curvature.
From the reviews:"This book provides a very readable introduction to Riemannian geometry and geometric analysis... With the vast development of the mathematical subject of geometric analysis, the present textbook is most welcome." Mathematical Reviews
"For readers familiar with the basics of differential geometry and some acquaintance with modern analysis, the book is reasonably self-contained. The book succeeds very well in laying out the foundations of modern Riemannian geometry and geometric analysis. It introduces a number of key techniques and provides a representative overview of the field." Monatshefte für Mathematik
Jürgen Jost is Codirector of the Max Planck Institute for Mathematics in the Sciences in Leipzig, Germany, an Honorary Professor at the Department of Mathematics and Computer Sciences at Leipzig University, and an External Faculty Member of the Santa Fe Institute for the Sciences of Complexity, New Mexico, USA. He is the author of a number of further Springer textbooks including Postmodern Analysis (1997, 2002, 2005), Compact Riemann Surfaces (1997, 2002, 2006), Partial Differential Equations (2002, 2007, 2013), Differentialgeometrie und Minimalflächen (1994, 2007, 2014, with J. Eschenburg), Dynamical Systems (2005), Mathematical Concepts (2015), as well as several research monographs, such as Geometry and Physics (2009), and many publications in scientific journals.
1 Riemannian Manifolds.- 2 Lie Groups and Vector Bundles.- 3 The Laplace Operator and Harmonic Differential Forms.- 4 Connections and Curvature.- 5 Geometry of Submanifolds.- 6 Geodesics and Jacobi Fields.- A Short Survey on Curvature and Topology.- 7 Symmetric Spaces and Kähler Manifolds.- 8 Morse Theory and Floer Homology.- 9 Harmonic Maps between Riemannian Manifolds.- 10 Harmonic Maps from Riemann Surfaces.- 11 Variational Problems from Quantum Field Theory.- A Linear Elliptic Partial Differential Equations.- B Fundamental Groups and Covering Spaces.- Bibliography.- Index.
"The present volume ends with two appendices (on linear elliptic partial differential equations and topological results about fundamental groups and covering spaces) and a rich bibliography of 454 items, including some classical books and papers. All the material, written in a clear and precise style, is carefully developed, many examples supporting the understanding. In the reviewer's opinion, this is an excellent book, a very useful addition to any good library." (Gabriel Eduard Vilcu, zbMATH 1380.53001, 2018)
“The present volume ends with two appendices (on linear elliptic partial differential equations and topological results about fundamental groups and covering spaces) and a rich bibliography of 454 items, including some classical books and papers. All the material, written in a clear and precise style, is carefully developed, many examples supporting the understanding. In the reviewer’s opinion, this is an excellent book, a very useful addition to any good library.” (Gabriel Eduard Vilcu, zbMATH 1380.53001, 2018)
| Erscheinungsdatum | 03.11.2017 |
|---|---|
| Reihe/Serie | Universitext |
| Zusatzinfo | XIV, 697 p. 19 illus., 4 illus. in color. |
| Verlagsort | Cham |
| Sprache | englisch |
| Maße | 155 x 235 mm |
| Gewicht | 1058 g |
| Themenwelt | Mathematik / Informatik ► Mathematik ► Geometrie / Topologie |
| Naturwissenschaften ► Physik / Astronomie | |
| Schlagworte | 53B21, 53L20, 32C17, 35I60, 49-XX, 58E20, 57R15 • Analytische Geometrie • Curvature • Differential & Riemannian geometry • Differential Geometry • Differential & Riemannian geometry • Dirac Operator • Floer homology • geodesics • geometry of submanifolds • Harmonic Functions • harmonic maps • Jacobi fields • Kähler manifolds • Kähler manifolds • Laplace Operator • Lie groups • Mathematical Physics • Mathematics • mathematics and statistics • Morse Theory • quantum field theory variational problems • Riemannian Geometry • riemannian manifolds • Riemannsche Geometrie • symmetric spaces • Symplectic Geometry • Theoretical, Mathematical and Computational Physic • theoretical physics variational principles • Vector Bundles |
| ISBN-10 | 3-319-61859-8 / 3319618598 |
| ISBN-13 | 978-3-319-61859-3 / 9783319618593 |
| Zustand | Neuware |
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