Introduction to Differentiable Manifolds

1. Front Matter

   Pages i-xi

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2. Differential Calculus

   • Serge Lang

   Pages 1-19

3. Manifolds

   • Serge Lang

   Pages 20-36

4. Vector Bundles

   • Serge Lang

   Pages 37-59

5. Vector Fields and Differential Equations

   • Serge Lang

   Pages 60-104

6. Operations on Vector Fields and Differential Forms

   • Serge Lang

   Pages 105-142

7. The Theorem of Frobenius

   • Serge Lang

   Pages 143-157

8. Metrics

   • Serge Lang

   Pages 158-179

9. Integration of Differential Forms

   • Serge Lang

   Pages 180-199

10. Stokes’ Theorem

    • Serge Lang

    Pages 200-213

11. Applications of Stokes’ Theorem

    • Serge Lang

    Pages 214-241

12. Correction to: Introduction to Differentiable Manifolds

    • Serge Lang

    Pages C1-C1

13. Back Matter

    Pages 243-250

    PDF

This book gives an introduction to the basic concepts which are used in differential topology, differential geometry, and differential equations. A certain number of concepts are essential for all three of these areas, and are so basic and elementary, that it is worthwhile to collect them together so that more advanced expositions can be given without having to start from the very beginning. The concepts are concerned with the general basic theory of differential manifolds. As a result, this book can be viewed as a prerequisite to Fundamentals of Differential Geometry. Since this book is intended as a text to follow advanced calculus, manifolds are assumed finite dimensional. In the new edition of this book, the author has made numerous corrections to the text and he has added a chapter on applications of Stokes' Theorem.

• Area
• Volume
• differential geometry
• differential topology
• manifold
• topology

From the reviews:

"This volume is an introduction to differential manifolds which is intended for post-graduate or advanced undergraduate students. … Basic concepts are presented, which are used in differential topology, differential geometry, and differential equations. Charts are used systematically … . The book is well readable, and it is of interest not only for mathematicians, but also for theory-oriented researchers in applied sciences, who need an introduction to this important topic." (I. Troch, Internationale Mathematische Nachrichten, Issue 196, 2004)

"The author recommends his text to ‘the first year graduate level or advanced undergraduate level’ … . his explanation is very precise, with rich formalism and with maximum generality … . In summary, this is an ideal text for people who like a more general and abstract approach to the topic." (EMS, June, 2003)

"The book offers a quick introduction to basic concepts which are used in differential topology, differential geometry and differential equations. … The bibliography contains important new titles in studying differential geometry. A large index is also included. This is an interesting Universitext (for students – the first year graduate level or advanced undergraduate level), with important concepts concerning the general basic theory of differential manifolds." (Corina Mohorianu, Zentralblatt MATH, Vol. 1008, 2003)

• Department of Mathematics, Yale University, New Haven, USA

  Serge Lang

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