arXiv:1611.05671 Abstract | arXiv Analytics

arXiv:1611.05671 [math.NT]Abstract References Reviews Resources

On a special case of Watkins' conjecture

Published 2016-11-17Version 1

Watkins' conjecture asserts that for a rational elliptic curve $E$ the degree of the modular parametrization is divisible by $2^r$, where $r$ is the rank of $E$. In this paper we prove that if the modular degree is odd then $E$ has rank $0$. Moreover, we prove that the conjecture holds for all rank two rational elliptic curves of prime conductor and positive discriminant.

Comments: 6 pages; comments are welcome

Categories: math.NT

Subjects: 11G05, 11F67

Keywords: special case, rational elliptic curve, conjecture asserts, prime conductor, modular parametrization

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arXiv:1611.05671 [math.NT]Abstract References Reviews Resources

On a special case of Watkins' conjecture

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On a special case of Watkins' conjecture

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arXiv:1611.05671 [math.NT]Abstract References Reviews Resources