The amount of mathematics invented for number-theoretic reasons is impressive. It includes much of complex analysis, the re-foundation of algebraic geometry on commutative algebra, group cohomology, homological algebra, and the theory of motives. Zeta and L-functions sit at the meeting point of all these theories and have played a profound role in shaping the evolution of number theory. This book presents a big picture of zeta and L-functions and the complex theories surrounding them, combining standard material with results and perspectives that are not made explicit elsewhere in the literature. Particular attention is paid to the development of the ideas surrounding zeta and L-functions, using quotes from original sources and comments throughout the book, pointing the reader towards the relevant history. Based on an advanced course given at Jussieu in 2013, it is an ideal introduction for graduate students and researchers to this fascinating story.
By:
Bruno Kahn
Imprint: Cambridge University Press
Country of Publication: United Kingdom
Dimensions:
Height: 226mm,
Width: 152mm,
Spine: 13mm
Weight: 330g
ISBN: 9781108703390
ISBN 10: 1108703399
Series: London Mathematical Society Lecture Note Series
Pages: 214
Publication Date: 07 May 2020
Audience:
Professional and scholarly
,
Undergraduate
Format: Paperback
Publisher's Status: Active
Introduction; 1. The Riemann zeta function; 2. The zeta function of a Z-scheme of finite type; 3. The Weil Conjectures; 4. L-functions from number theory; 5. L-functions from geometry; 6. Motives; Appendix A. Karoubian and monoidal categories; Appendix B. Triangulated categories, derived categories, and perfect complexes; Appendix C. List of exercises; Bibliography; Index.
Bruno Kahn is Directeur de recherche at CNRS. He has written around 100 research papers in areas including algebraic and arithmetic geometry, algebraic K-theory and the theory of motives.
Reviews for Zeta and L-Functions of Varieties and Motives
'The book will be of interest to both young mathematicians and physicists as well as experienced scholars.' Nikolaj M. Glazunov, ZB Math Open