
Analysis I (English, Herbert Amann)
5.0(1 reviews)Inclusive of all applicable taxes. Free shipping on orders above ₹499, else ₹49 flat.
Available Offers
- 🚚Free Delivery — Free on orders above ₹499, else ₹49 flat
- 💵Cash on Delivery — Pay when your order arrives
- ↩️15-Day Easy Returns — Hassle-free return policy
- 🔒Cash on Delivery — Pay safely when your order arrives
Check Delivery
Specifications
| Publisher | Birkhauser |
| Language | English |
| ISBN-13 | 9783764371531 |
| ISBN-10 | 3764371536 |
| Author | Herbert Amann |
Product Description
About the Book
This book is the first of a three volume introduction to analysis. It is distinguished by its modern and clear presentation, concentrating always on the essential concepts. In contrast to most other textbooks, there is no artificial separation between the theories of one variable and that of many variables. Emphasis is placed on the early development of a solid foundation in topology. As well, the basics of complex analysis are covered. This book…
ISBN: 9783764371531
Book Insights
What You'll Learn
- ·About the Book This book is the first of a three volume introduction to analysis
- ·It is distinguished by its modern and clear presentation, concentrating always on the essential concepts
- ·As well, the basics of complex analysis are covered
Who Should Read This
Beginners and newcomers to the subject, as well as curious general readers.
Key Highlights
- ·It is distinguished by its modern and clear presentation, concentrating always on the essential concepts
- ·Brand new physical book delivered across India
- ·15-day hassle-free return policy
Customer Reviews
A Brilliantly Organized and Detailed Introduction to Analysis
Amann's and Escher's Analysis Volume I, together with Volumes II and III, comprise an incredibly rich, comprehensive and self-contained treatment of elementary through advanced analysis. Beginning with set theory and a construction of the real numbers, the authors proceed lemma-by-lemma, theorem-by-theorem to the statement and proof of Stoke's Theorem for manifolds in the last chapter of volume III.The authors' typical style, as they admit in their preface, is to define mathematical objects and











