Many Rational Points - N.E. Hurt

Many Rational Points

Coding Theory and Algebraic Geometry

(Autor)

Buch | Hardcover
346 Seiten
2003
Springer-Verlag New York Inc.
978-1-4020-1766-7 (ISBN)
106,99 inkl. MwSt
Presents a comprehensive treatment of the results on algebraic geometry as they apply to coding theory and cryptography, with the goal to study the algebraic curves and varieties with many rational points. This book surveys the classification of abelian surfaces, hyperelliptic curves, modular towers, Shimura curves and modular jacobian surfaces.
2 Triangle Groups: An Introduction 279 3 Elementary Shimura Curves 281 4 Examples of Shimura Curves 282 5 Congruence Zeta Functions 283 6 Diophantine Properties of Shimura Curves 284 7 Klein Quartic 285 8 Supersingular Points 289 Towers of Elkies 9 289 7. CRYPTOGRAPHY AND APPLICATIONS 291 1 Introduction 291 Discrete Logarithm Problem 2 291 Curves for Public-Key Cryptosystems 3 295 Hyperelliptic Curve Cryptosystems 4 297 CM-Method 5 299 6 Cryptographic Exponent 300 7 Constructive Descent 302 8 Gaudry and Harley Algorithm 306 9 Picard Jacobians 307 Drinfeld Module Based Public Key Cryptosystems 10 308 11 Drinfeld Modules and One Way Functions 308 12 Shimura's Map 309 13 Modular Jacobians of Genus 2 Curves 310 Modular Jacobian Surfaces 14 312 15 Modular Curves of Genus Two 313 16 Hecke Operators 314 8. REFERENCES 317 345 Index Xll Preface The history of counting points on curves over finite fields is very ex- tensive, starting with the work of Gauss in 1801 and continuing with the work of Artin, Schmidt, Hasse and Weil in their study of curves and the related zeta functions Zx(t), where m Zx(t) = exp (2: N t ) m m 2': 1 m with N = #X(F qm).
If X is a curve of genus g, Weil's conjectures m state that L(t) Zx(t) = (1 - t)(l - qt) where L(t) = rr~!l (1 - O'.

Abelian Varieties.- Refined Bounds.- Codes and Curves.- Deligne-Lusztig Spaces.- Drinfeld Modules.- Shimura Curves.- Cryptography and Applications.- References.

Erscheint lt. Verlag 30.11.2003
Reihe/Serie Mathematics and Its Applications ; 564
Mathematics and Its Applications ; 564
Zusatzinfo XXI, 346 p.
Verlagsort New York, NY
Sprache englisch
Maße 155 x 235 mm
Themenwelt Mathematik / Informatik Mathematik Analysis
Mathematik / Informatik Mathematik Geometrie / Topologie
ISBN-10 1-4020-1766-9 / 1402017669
ISBN-13 978-1-4020-1766-7 / 9781402017667
Zustand Neuware
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