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ISBN: 0521658179 9780521658171 9781139174879 9780521582285 Year: 1997 Publisher: Cambridge Cambridge University Press
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ISBN: 1139174878 Year: 1997 Publisher: Cambridge : Cambridge University Press,
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The subject of elliptic curves is one of the jewels of nineteenth-century mathematics, originated by Abel, Gauss, Jacobi, and Legendre. This 1997 book presents an introductory account of the subject in the style of the original discoverers, with references to and comments about more recent and modern developments. It combines three of the fundamental themes of mathematics: complex function theory, geometry, and arithmetic. After an informal preparatory chapter, the book follows an historical path, beginning with the work of Abel and Gauss on elliptic integrals and elliptic functions. This is followed by chapters on theta functions, modular groups and modular functions, the quintic, the imaginary quadratic field, and on elliptic curves. Requiring only a first acquaintance with complex function theory, this book is an ideal introduction to the subject for graduate students and researchers in mathematics and physics, with many exercises with hints scattered throughout the text.
ISBN: 0521425301 0521415179 9780521415170 9780521425308 Year: 1995 Volume: 24 Publisher: Cambridge Cambridge University Press
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Number theory --- Curves, Elliptic --- Curves, Elliptic. --- Curves, elliptic
ISBN: 0521582288 Year: 1997 Publisher: Cambridge, U.K ; New York : Cambridge University Press,
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The subject of elliptic curves is one of the jewels of nineteenth-century mathematics, originated by Abel, Gauss, Jacobi, and Legendre. This book presents an introductory account of the subject in the style of the original discoverers, with references to and comments about more recent and modern developments. It combines three of the fundamental themes of mathematics: complex function theory, geometry, and arithmetic. After an informal preparatory chapter, the book follows an historical path, beginning with the work of Abel and Gauss on elliptic integrals and elliptic functions. This is followed by chapters on theta functions, modular groups and modular functions, the quintic, the imaginary quadratic field, and on elliptic curves. Requiring only a first acquaintance with complex function theory, this book is an ideal introduction to the subject for graduate students and researchers in mathematics and physics, with many exercises with hints scattered throughout the text.
Curves, Elliptic --- Courbes elliptiques --- Curves, Elliptic.
ISBN: 0521598206 9780521598200 Year: 1997 Publisher: Cambridge: Cambridge university press,
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Curves, Elliptic --- Curves, Elliptic --- Curves, Modular --- Curves, Modular
ISBN: 0821869949 Year: 1994 Publisher: Providence (RI) American Mathematical Society
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ISBN: 0306447894 1441932410 1475723261 9780306447891 Year: 1994 Publisher: New York Plenum
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ISBN: 9810243375 Year: 2005 Publisher: Singapore World Scientific
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Algebraic geometry --- Curves, Elliptic. --- Forms, Modular.
ISBN: 1316086992 1107091322 1107088291 1107100313 110709450X 1139172530 9781107088290 9781139172530 0521415179 9780521415170 0521425301 9780521425308 9781316086995 9781107091320 9781107100312 Year: 1991 Volume: 24 Publisher: Cambridge New York Cambridge University Press
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The study of (special cases of) elliptic curves goes back to Diophantos and Fermat, and today it is still one of the liveliest centres of research in number theory. This book, which is addressed to beginning graduate students, introduces basic theory from a contemporary viewpoint but with an eye to the historical background. The central portion deals with curves over the rationals: the Mordell-Weil finite basis theorem, points of finite order (Nagell-Lutz) etc. The treatment is structured by the local-global standpoint and culminates in the description of the Tate-Shafarevich group as the obstruction to a Hasse principle. In an introductory section the Hasse principle for conics is discussed. The book closes with sections on the theory over finite fields (the 'Riemann hypothesis for function fields') and recently developed uses of elliptic curves for factoring large integers. Prerequisites are kept to a minimum; an acquaintance with the fundamentals of Galois theory is assumed, but no knowledge either of algebraic number theory or algebraic geometry is needed. The p-adic numbers are introduced from scratch, as is the little that is needed on Galois cohomology. Many examples and exercises are included for the reader. For those new to elliptic curves, whether they are graduate students or specialists from other fields, this will be a fine introductory text.
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ISBN: 1614995206 9781614995203 9781614995197 Year: 2015 Publisher: Amsterdam, Netherlands : IOS Press,
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Curves, Elliptic --- Cryptography --- Elliptic curves --- Curves, Algebraic
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