Ultrametric Calculus
Ultrametric Calculus
$101.00
USDThis is an introduction to p-adic analysis which is elementary yet complete and which displays the variety of applications of the subject. Dr Schikhof is able to point out and explain how p-adic and 'real' analysis differ. This approach guarantees the reader quickly becomes acquainted with this equally 'real' analysis and appreciates its relevance. The reader's understanding is enhanced and deepened by the large number of exercises included throughout; these both test the reader's grasp and extend the text in interesting directions. As a consequence, this book will become a standard reference for professionals (especially in p-adic analysis, number theory and algebraic geometry) and will be welcomed as a textbook for advanced students of mathematics familiar with algebra and analysis.
Product details
March 2011Adobe eBook Reader
9780511867354
0 pages
0kg
This ISBN is for an eBook version which is distributed on our behalf by a third party.
Table of Contents
- Frontispiece
- Preface
- Part I. Valuations:
- 1. Valuations
- 2. Ultrametrics
- Part II. Calculus:
- 3. Elementary calculus
- 4. Interpolation
- 5. Analytic functions
- Part III. Functions on Zp:
- 6. Mahler's base and p-adic integration
- 7. The p-adic gamma and zeta functions
- 8. van der Put's base and antiderivation
- Part IV. More General Theory of Functions:
- 9. Continuity and differentiability
- 10. Cn -theory
- 11. Monotone functions
- Appendixes
- Further reading
- Notation
- Index.
