Elliptic Curves with Large Rank over Function Fields

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Author
Ulmer, Douglas
Affiliation
Department of Mathematics, University of Arizona
Issue Date
2002-01

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Publisher
JSTOR
Citation
Ulmer, D. (2002). Elliptic Curves with Large Rank over Function Fields. Annals of Mathematics, 155(1), 295–315.
Journal
Annals of Mathematics
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This item from the UA Faculty Publications collection is made available by the University of Arizona with support from the University of Arizona Libraries. If you have questions, please contact us at repository@u.library.arizona.edu.
Abstract
We produce explicit elliptic curves over Fp(t) whose Mordell-Weil groups have arbitrarily large rank. Our method is to prove the conjecture of B and Swinnerton-Dyer for these curves (or rather the Tate conjecture for related elliptic surfaces) and then use zeta functions to determine the rank. In contrast to earlier examples of Shafarevitch and Tate, our curves are not isotrivial. Asymptotically these curves have maximal rank for their conductor. Motivated by this fact, we make a conjecture about the growth of ranks of elliptic curves over number fields.
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Immediate access
ISSN
0003-486X
DOI
10.2307/3062158
Version
Final accepted manuscript
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