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＜電子ブック＞
Rational Points on Elliptic Curves / by Joseph H. Silverman, John T. Tate
(Undergraduate Texts in Mathematics. ISSN:21975604)

版	2nd ed. 2015.
出版者	(Cham : Springer International Publishing : Imprint: Springer)
出版年	2015
本文言語	英語
大きさ	XXII, 332 p. 37 illus : online resource
著者標目	*Silverman, Joseph H author Tate, John T author SpringerLink (Online service)
件　名	LCSH:Algebraic geometry LCSH:Number theory LCSH:Data structures (Computer science) LCSH:Information theory FREE:Algebraic Geometry FREE:Number Theory FREE:Data Structures and Information Theory
一般注記	Introduction -- Geometry and Arithmetic -- Points of Finite Order -- The Group of Rational Points -- Cubic Curves over Finite Fields -- Integer Points on Cubic Curves -- Complex Multiplication The theory of elliptic curves involves a pleasing blend of algebra, geometry, analysis, and number theory. This book stresses this interplay as it develops the basic theory, thereby providing an opportunity for advanced undergraduates to appreciate the unity of modern mathematics. At the same time, every effort has been made to use only methods and results commonly included in the undergraduate curriculum. This accessibility, the informal writing style, and a wealth of exercises make Rational Points on Elliptic Curves an ideal introduction for students at all levels who are interested in learning about Diophantine equations and arithmetic geometry. Most concretely, an elliptic curve is the set of zeroes of a cubic polynomial in two variables. If the polynomial has rational coefficients, then one can ask for a description of those zeroes whose coordinates are either integers or rational numbers. It is this number theoretic question that is the main subject of this book.Topics covered include the geometry and group structure of elliptic curves, the Nagell–Lutz theorem describing points of finite order, the Mordell–Weil theorem on the finite generation of the group of rational points, the Thue–Siegel theorem on the finiteness of the set of integer points, theorems on counting points with coordinates in finite fields, Lenstra’s elliptic curve factorization algorithm, and a discussion of complex multiplication and the Galois representations associated to torsion points. Additional topics new to the second edition include an introduction to elliptic curve cryptography and a brief discussion of the stunning proof of Fermat’s Last Theorem by Wiles et al. via the use of elliptic curves HTTP:URL=https://doi.org/10.1007/978-3-319-18588-0

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