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Unit Equations in Diophantine Number Theory
A comprehensive, graduate-level treatment of unit equations and their various applications.
Jan-Hendrik Evertse (Author), Kálmán Gy?ry (Author)
9781107097605, Cambridge University Press
Hardback, published 30 December 2015
378 pages
23.5 x 15.8 x 2.5 cm, 0.66 kg
'Understanding the book requires only basic knowledge in algebra (groups, commutative rings, fields, Galois theory and elementary algebraic number theory). In particular the concepts of height, places and valuations play an important role. … In addition to providing a survey, the authors improve both formulations and proofs of various important existing results in the literature, making their book a valuable asset for researchers in this area. … I thank them for their fast and clear answers.' Pieter Moree, Nieuw Archief voor Wiskunde
Diophantine number theory is an active area that has seen tremendous growth over the past century, and in this theory unit equations play a central role. This comprehensive treatment is the first volume devoted to these equations. The authors gather together all the most important results and look at many different aspects, including effective results on unit equations over number fields, estimates on the number of solutions, analogues for function fields and effective results for unit equations over finitely generated domains. They also present a variety of applications. Introductory chapters provide the necessary background in algebraic number theory and function field theory, as well as an account of the required tools from Diophantine approximation and transcendence theory. This makes the book suitable for young researchers as well as experts who are looking for an up-to-date overview of the field.
Preface
Summary
Glossary of frequently used notation
Part I. Preliminaries: 1. Basic algebraic number theory
2. Algebraic function fields
3. Tools from Diophantine approximation and transcendence theory
Part II. Unit equations and applications: 4. Effective results for unit equations in two unknowns over number fields
5. Algorithmic resolution of unit equations in two unknowns
6. Unit equations in several unknowns
7. Analogues over function fields
8. Effective results for unit equations over finitely generated domains
9. Decomposable form equations
10. Further applications
References
Index.
