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Analytic Number Theory
Jean-Marie De Koninck, Florian Luca
Price
1770.00
ISBN
9781470425838
Language
English
Pages
432
Format
Paperback
Dimensions
180 x 240 mm
Year of Publishing
2016
Series
American Mathematical Society
Territorial Rights
Restricted
Imprint
Universities Press
Catalogues
Engineering & Technology
,
Mathematics
About the Book
About the Author
Table of Contents
The authors assemble a fascinating collection of topics from analytic number theory that provides an introduction to the subject with a very clear and unique focus on the anatomy of integers, that is, on the study of the multiplicative structure of the integers. Some of the most important topics presented are the global and local behavior of arithmetic functions, an extensive study of smooth numbers, the Hardy–Ramanujan and Landau theorems, characters and the Dirichlet theorem, the abc conjecture along with some of its applications, and sieve methods. The book concludes with a whole chapter on the index of composition of an integer. One of this book’s best features is the collection of problems at the end of each chapter that have been chosen carefully to reinforce the material. The authors include solutions to the even-numbered problems, making this volume very appropriate for readers who want to test their understanding of the theory presented in the book
Jean-Marie De Koninck
is Professor of Mathematics at Université Laval, Quebec City, Canada.
Florian Luca
is Doctor en Matemáticas at the Centro de Ciencias Matemáticas, Universidad Nacional Autonoma de México, Morelia, México.
Preface
Chapter 1. Preliminary Notions
Chapter 2. Prime Numbers and Their Properties
Chapter 3. The Riemann Zeta Function
Chapter 4. Setting the Stage for the Proof of the Prime Number
Chapter 5. The Proof of the Prime Number Theorem
Chapter 6. The Global Behavior of Arithmetic Functions
Chapter 7. The Local Behavior of Arithmetic Functions
Chapter 8. The Fascinating Euler Function
Chapter 9. Smooth Numbers
Chapter 10. The Hardy–Ramanujan and Landau Theorems
Chapter 11. The abc Conjecture and Some of Its Applications
Chapter 12. Sieve Methods
Chapter 13. Prime Numbers in Arithmetic Progression
Chapter 14. Characters and the Dirichlet Theorem
Chapter 15. Selected Applications of Primes in Arithmetic Progression
Chapter 16. The Index of Composition of an Integer
Appendix: Basic Complex Analysis Theory
Bibliography
Index