Elliptic Curves. (MN-40), Volume 40 / / Anthony W. Knapp.
An elliptic curve is a particular kind of cubic equation in two variables whose projective solutions form a group. Modular forms are analytic functions in the upper half plane with certain transformation laws and growth properties. The two subjects--elliptic curves and modular forms--come together i...
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| Superior document: | Title is part of eBook package: De Gruyter Princeton Mathematical Notes eBook-Package 1970-2016 |
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| Place / Publishing House: | Princeton, NJ : : Princeton University Press, , [2018] ©1993 |
| Year of Publication: | 2018 |
| Language: | English |
| Series: | Mathematical Notes ;
40 |
| Online Access: | |
| Physical Description: | 1 online resource |
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| Other title: | Frontmatter -- CONTENTS -- List of Figures -- List of Tables -- Preface -- Standard Notation -- Elliptic Curves -- I. Overview -- II. Curves in Projective Space -- III. Cubic Curves in Weierstrass Form -- IV. Mordell's Theorem -- V. Torsion Subgroup of E(Q) -- VI. Complex Points -- VII. Dirichlet's Theorem -- VIII. Modular Forms for SL(2,ℤ) -- IX. Modular Forms for Hecke Subgroups -- X. L Function of an Elliptic Curve -- XI. Eichler-Shimura Theory -- XII. Taniyama-Weil Conjecture -- Notes -- References -- Index of Notation -- Index |
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| Summary: | An elliptic curve is a particular kind of cubic equation in two variables whose projective solutions form a group. Modular forms are analytic functions in the upper half plane with certain transformation laws and growth properties. The two subjects--elliptic curves and modular forms--come together in Eichler-Shimura theory, which constructs elliptic curves out of modular forms of a special kind. The converse, that all rational elliptic curves arise this way, is called the Taniyama-Weil Conjecture and is known to imply Fermat's Last Theorem. Elliptic curves and the modeular forms in the Eichler- Shimura theory both have associated L functions, and it is a consequence of the theory that the two kinds of L functions match. The theory covered by Anthony Knapp in this book is, therefore, a window into a broad expanse of mathematics--including class field theory, arithmetic algebraic geometry, and group representations--in which the concidence of L functions relates analysis and algebra in the most fundamental ways. Developing, with many examples, the elementary theory of elliptic curves, the book goes on to the subject of modular forms and the first connections with elliptic curves. The last two chapters concern Eichler-Shimura theory, which establishes a much deeper relationship between the two subjects. No other book in print treats the basic theory of elliptic curves with only undergraduate mathematics, and no other explains Eichler-Shimura theory in such an accessible manner. |
| Format: | Mode of access: Internet via World Wide Web. |
| ISBN: | 9780691186900 9783110494921 9783110442496 |
| DOI: | 10.1515/9780691186900?locatt=mode:legacy |
| Access: | restricted access |
| Hierarchical level: | Monograph |
| Statement of Responsibility: | Anthony W. Knapp. |