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Ever since the analogy between number fields and function fields was discovered, it has been a source of inspiration for new ideas, and a long history has not in any way detracted from the appeal of the subject.
As a deeper understanding of this analogy could have tremendous consequences, the search for a unified approach has become a sort of Holy Grail. The arrival of Arakelov's new geometry that tries to put the archimedean places on a par with the finite ones gave a new impetus and led to spectacular success in Faltings' hands. There are numerous further examples where ideas or techniques from the more geometrically-oriented world of function fields have led to new insights in the more arithmetically-oriented world of number fields, or vice versa.
These invited articles by leading researchers in the field explore various aspects of the parallel worlds of function fields and number fields. Topics range from Arakelov geometry, the search for a theory of varieties over the field with one element, via Eisenstein series to Drinfeld modules, and t-motives.
This volume is aimed at a wide audience of graduate students, mathematicians, and researchers interested in geometry and arithmetic and their connections.
Contributors: G. Böckle; T. van den Bogaart; H. Brenner; F. Breuer; K. Conrad; A. Deitmar; C. Deninger; B. Edixhoven; G. Faltings; U. Hartl; R. de Jong; K. Köhler; U. Kühn; J.C. Lagarias; V. Maillot; R. Pink; D. Roessler; and A. Werner.
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From the reviews:
“I thoroughly enjoyed the book; referring to it now and then through the various pages has been a wonderful experience. … It is a stimulating and well-researched volume, aimed at a wide audience of gradute students, mathematicians, and researchers interested in geometry and arithmetic and their connections. In short, it places a most engaging progress in mathematics volume in the hands of the target audience who will enjoy, not just profit from, the different aspects of the involved parallelism.” (Current Engineering Practice, Vol. 48, 2005-2006)
- Inhaltsverzeichnis (15 Kapitel)
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Arithmetic over Function Fields: A Cohomological Approach
Seiten 1-38
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Algebraic Stacks Whose Number of Points over Finite Fields is a Polynomial
Seiten 39-49
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On a Problem of Miyaoka
Seiten 51-59
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Monodromy Groups Associated to Non-Isotrivial Drinfeld Modules in Generic Characteristic
Seiten 61-69
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Irreducible Values of Polynomials: A Non-Analogy
Seiten 71-85
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Inhaltsverzeichnis (15 Kapitel)
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Bibliografische Information
- Bibliographic Information
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- Buchtitel
- Number Fields and Function Fields – Two Parallel Worlds
- Herausgeber
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- Gerard van der Geer
- B.J.J Moonen
- René Schoof
- Titel der Buchreihe
- Progress in Mathematics
- Buchreihen Band
- 239
- Copyright
- 2005
- Verlag
- Birkhäuser Basel
- Copyright Inhaber
- Birkhäuser Boston
- eBook ISBN
- 978-0-8176-4447-5
- DOI
- 10.1007/0-8176-4447-4
- Hardcover ISBN
- 978-0-8176-4397-3
- Buchreihen ISSN
- 0743-1643
- Auflage
- 1
- Seitenzahl
- XIII, 321
- Themen
