Introduction to Geometry and Topology
лип. 2018 р. · Birkhäuser
Електронна книга
169
Сторінки
reportGoogle не перевіряє оцінки й відгуки. Докладніше.
Про цю електронну книгу
This book provides an introduction to topology, differential topology, and differential geometry. It is based on manuscripts refined through use in a variety of lecture courses. The first chapter covers elementary results and concepts from point-set topology. An exception is the Jordan Curve Theorem, which is proved for polygonal paths and is intended to give students a first glimpse into the nature of deeper topological problems.
The second chapter of the book introduces manifolds and Lie groups, and examines a wide assortment of examples. Further discussion explores tangent bundles, vector bundles, differentials, vector fields, and Lie brackets of vector fields. This discussion is deepened and expanded in the third chapter, which introduces the de Rham cohomology and the oriented integral and gives proofs of the Brouwer Fixed-Point Theorem, the Jordan-Brouwer Separation Theorem, and Stokes's integral formula.
The fourth and final chapter is devoted to the fundamentals of differential geometry and traces the development of ideas from curves to submanifolds of Euclidean spaces. Along the way, the book discusses connections and curvature--the central concepts of differential geometry. The discussion culminates with the Gauß equations and the version of Gauß's theorema egregium for submanifolds of arbitrary dimension and codimension.
This book is primarily aimed at advanced undergraduates in mathematics and physics and is intended as the template for a one- or two-semester bachelor's course.
The second chapter of the book introduces manifolds and Lie groups, and examines a wide assortment of examples. Further discussion explores tangent bundles, vector bundles, differentials, vector fields, and Lie brackets of vector fields. This discussion is deepened and expanded in the third chapter, which introduces the de Rham cohomology and the oriented integral and gives proofs of the Brouwer Fixed-Point Theorem, the Jordan-Brouwer Separation Theorem, and Stokes's integral formula.
The fourth and final chapter is devoted to the fundamentals of differential geometry and traces the development of ideas from curves to submanifolds of Euclidean spaces. Along the way, the book discusses connections and curvature--the central concepts of differential geometry. The discussion culminates with the Gauß equations and the version of Gauß's theorema egregium for submanifolds of arbitrary dimension and codimension.
This book is primarily aimed at advanced undergraduates in mathematics and physics and is intended as the template for a one- or two-semester bachelor's course.
Про автора
Werner Ballmann is Professor of Differential Geometry at the University of Bonn and Director at the Max Planck Institute for Mathematics in Bonn.
Оцініть цю електронну книгу
Повідомте нас про свої враження.
Як читати
Смартфони та планшети
Установіть додаток Google Play Книги для Android і iPad або iPhone. Він автоматично синхронізується з вашим обліковим записом і дає змогу читати книги в режимах онлайн і офлайн, де б ви не були.
Портативні та настільні комп’ютери
Ви можете слухати аудіокниги, куплені в Google Play, у веб-переглядачі на комп’ютері.
eReader та інші пристрої
Щоб користуватися пристроями для читання електронних книг із технологією E-ink, наприклад Kobo, вам знадобиться завантажити файл і перенести його на відповідний пристрій. Докладні вказівки з перенесення файлів на підтримувані пристрої можна знайти в Довідковому центрі.
