Transcendental Number Theory
Transcendental Number Theory
$39.99
USDFirst published in 1975, this classic book gives a systematic account of transcendental number theory, that is, the theory of those numbers that cannot be expressed as the roots of algebraic equations having rational coefficients. Their study has developed into a fertile and extensive theory, which continues to see rapid progress today. Expositions are presented of theories relating to linear forms in the logarithms of algebraic numbers, of Schmidt's generalization of the Thue–�Siegel–�Roth theorem, of Shidlovsky's work on Siegel's E-functions and of Sprindžuk's solution to the Mahler conjecture. This edition includes an introduction written by David Masser describing Baker's achievement, surveying the content of each chapter and explaining the main argument of Baker's method in broad strokes. A new afterword lists recent developments related to Baker's work.
- Provides a systematic account of transcendental number theory, discussing the author's own advances and their many applications
- Written by one of the leading British mathematicians of the past century on a topic of enduring interest
- Includes a new introduction and afterword written by David Masser, a contemporary expert
Reviews & endorsements
'Baker's book is the book on transcendental numbers. He covers a majority of those areas that have reached definitive results, presents most of the proofs in a complete yet far more compact form than hitherto available, and covers historical and bibliographical matters with great thoroughness and impeccable scholarship. As literature, it compares well with the finest works of Landau, Rademacher, and Titchmarsh.' Kenneth B. Stolarsky, Bulletin of the American Mathematical Society
Product details
June 2022Paperback
9781009229944
190 pages
228 × 151 × 11 mm
0.29kg
Not yet published - available from February 2025
Table of Contents
- Introduction David Masser
- Preface
- 1. The origins
- 2. Linear forms in logarithms
- 3. Lower bounds for linear forms
- 4. Diophantine equations
- 5. Class numbers of imaginary quadratic fields
- 6. Elliptic functions
- 7. Rational approximations to algebraic numbers
- 8. Mahler's classification
- 9. Metrical theory
- 10. The exponential function
- 11. The Shiegel–Shidlovsky theorems
- 12. Algebraic independence
- Bibliography
- Original papers
- Further publications
- New developments
- Some Developments since 1990 David Masser
- Index.
