More about the book
Elliptic Tales explores significant advancements in number theory through the lens of the Birch and Swinnerton-Dyer Conjecture, an unsolved problem in mathematics with a $1 million prize from the Clay Mathematics Institute for a general solution. Central to the conjecture are elliptic curves, cubic equations in two variables that, despite their simplicity, stem from profound and often enigmatic mathematical concepts. Authors Ash and Gross make these complex ideas accessible to general readers using basic algebra and calculus, accompanied by numerous enlightening examples. They take readers to the cutting edge of modern mathematics while providing an engaging introduction to key discoveries in algebraic geometry, abstract algebra, and number theory over the last three centuries. The narrative illustrates how mathematics evolves into more abstract realms to address increasingly difficult problems, with each generation of mathematicians building upon the achievements of their predecessors. Ash and Gross clarify how the Birch and Swinnerton-Dyer Conjecture illuminates the number theory of elliptic curves, revealing a beautiful and surprising connection between calculus and algebra derived from these curves.
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Elliptic Tales, Avner Ash, Robert Groß
- Language
- Released
- 2014
- product-detail.submit-box.info.binding
- (Paperback)
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- Title
- Elliptic Tales
- Subtitle
- Curves, Counting, and Number Theory
- Language
- English
- Authors
- Avner Ash, Robert Groß
- Publisher
- Princeton University Press
- Released
- 2014
- Format
- Paperback
- Pages
- 253
- ISBN10
- 0691163502
- ISBN13
- 9780691163505
- Series
- Tags
- Non-Fiction, Historical Themes, Science & Math, Nature, Natural sciences, USA, Mathematics, Nature, Animals, Geometry, Algebra, History of Mathematics, Number Theory
- Description
- Elliptic Tales explores significant advancements in number theory through the lens of the Birch and Swinnerton-Dyer Conjecture, an unsolved problem in mathematics with a $1 million prize from the Clay Mathematics Institute for a general solution. Central to the conjecture are elliptic curves, cubic equations in two variables that, despite their simplicity, stem from profound and often enigmatic mathematical concepts. Authors Ash and Gross make these complex ideas accessible to general readers using basic algebra and calculus, accompanied by numerous enlightening examples. They take readers to the cutting edge of modern mathematics while providing an engaging introduction to key discoveries in algebraic geometry, abstract algebra, and number theory over the last three centuries. The narrative illustrates how mathematics evolves into more abstract realms to address increasingly difficult problems, with each generation of mathematicians building upon the achievements of their predecessors. Ash and Gross clarify how the Birch and Swinnerton-Dyer Conjecture illuminates the number theory of elliptic curves, revealing a beautiful and surprising connection between calculus and algebra derived from these curves.


