1![Introduction The present work grew out of an entirely unsuccessful attempt to answer some basic questions about elliptic curves over $. Start with an elliptic curve E over $, say given by a Weierstrass equation E: y2 = 4 Introduction The present work grew out of an entirely unsuccessful attempt to answer some basic questions about elliptic curves over $. Start with an elliptic curve E over $, say given by a Weierstrass equation E: y2 = 4](https://www.pdfsearch.io/img/500250d9237e07bda0e484bf0c021b45.jpg) | Add to Reading ListSource URL: web.math.princeton.eduLanguage: English - Date: 2001-03-31 11:30:21
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2![Research Statement Brandon Fodden The central focus of my research is the study of L-functions. A combination of powerful results and fundamental open questions makes this an exciting area in which to do research. The st Research Statement Brandon Fodden The central focus of my research is the study of L-functions. A combination of powerful results and fundamental open questions makes this an exciting area in which to do research. The st](https://www.pdfsearch.io/img/e1ea7989353cf4b95e5a150e4ab96d64.jpg) | Add to Reading ListSource URL: people.math.carleton.caLanguage: English - Date: 2011-11-05 17:17:54
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3![On Cornacchia’s algorithm for solving the diophantine equation u2 + dv 2 = m F. Morain ∗† J.-L. Nicolas ‡ September 12, 1990 On Cornacchia’s algorithm for solving the diophantine equation u2 + dv 2 = m F. Morain ∗† J.-L. Nicolas ‡ September 12, 1990](https://www.pdfsearch.io/img/b436287c069931d406ee7adab92fb2a7.jpg) | Add to Reading ListSource URL: www.lix.polytechnique.frLanguage: English - Date: 2008-02-13 07:49:18
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4![KNOW THAT THERE ARE NUMBERS THAT ARE NOT RATIONAL, AND APPROXIMATE THEM BY RATIONAL NUMBERS GRADE 8 MATHEMATICS KNOW THAT THERE ARE NUMBERS THAT ARE NOT RATIONAL, AND APPROXIMATE THEM BY RATIONAL NUMBERS GRADE 8 MATHEMATICS](https://www.pdfsearch.io/img/ae6dd0dc957a485b9d4c2d6e8eab111e.jpg) | Add to Reading ListSource URL: sau50.orgLanguage: English - Date: 2014-08-01 11:06:02
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5![Logic, Elliptic curves, and Diophantine stability
Hilbert’s classical Tenth Problem Given a diophantine equation with any number of unknown quantities and with rational integral numerical Logic, Elliptic curves, and Diophantine stability
Hilbert’s classical Tenth Problem Given a diophantine equation with any number of unknown quantities and with rational integral numerical](https://www.pdfsearch.io/img/6137599b30c34338d8c77055b73e2490.jpg) | Add to Reading ListSource URL: www.math.harvard.eduLanguage: English - Date: 2014-11-09 17:01:10
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6![MATHEMATICS OF COMPUTATION Volume 75, Number 254, Pages 935–940 SArticle electronically published on December 19, 2005 THE DIOPHANTINE EQUATION x4 + 2y 4 = z 4 + 4w4 MATHEMATICS OF COMPUTATION Volume 75, Number 254, Pages 935–940 SArticle electronically published on December 19, 2005 THE DIOPHANTINE EQUATION x4 + 2y 4 = z 4 + 4w4](https://www.pdfsearch.io/img/2efdeda08ec3e33d2d1299787c16946c.jpg) | Add to Reading ListSource URL: www.staff.uni-bayreuth.deLanguage: English - Date: 2009-04-09 04:02:28
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7![June 2011 • Volume 4 • Number 5 To Foster and Nurture Girls’ Interest in Mathematics An Interview Interview with Bianca Viray, Part 1 Who Won the 1989 Tour de France? June 2011 • Volume 4 • Number 5 To Foster and Nurture Girls’ Interest in Mathematics An Interview Interview with Bianca Viray, Part 1 Who Won the 1989 Tour de France?](https://www.pdfsearch.io/img/d22e9c1641a8731ec2c08c462eba4110.jpg) | Add to Reading ListSource URL: www.girlsangle.orgLanguage: English - Date: 2011-06-30 22:38:08
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8![](https://www.pdfsearch.io/img/e7b9c7f7524649aa0e1baf14bb6f4a46.jpg) | Add to Reading ListSource URL: www.numbertheory.orgLanguage: English - Date: 2015-02-04 18:09:41
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9![math 420 First Mid-term NO CALCULATORS Friday October 9, 1987 math 420 First Mid-term NO CALCULATORS Friday October 9, 1987](https://www.pdfsearch.io/img/d879e38c2cb708ea1edb19f3c6f4ab58.jpg) | Add to Reading ListSource URL: www.math.hawaii.eduLanguage: English - Date: 2001-04-07 05:48:27
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10![AN EQUIVALENT FORM OF THE DUJELLA UNICITY CONJECTURE The Dujella unicity conjecture states that the diophantine equation x2 − (k 2 + 1)y 2 = k 2 AN EQUIVALENT FORM OF THE DUJELLA UNICITY CONJECTURE The Dujella unicity conjecture states that the diophantine equation x2 − (k 2 + 1)y 2 = k 2](https://www.pdfsearch.io/img/fc41daf22caa05995f268e5945c47810.jpg) | Add to Reading ListSource URL: www.numbertheory.orgLanguage: English - Date: 2014-11-27 21:12:16
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