On a conjecture of Mazur predicting the growth of Mordell--Weil ranks in Zp-extensions
Abstract
Let p be an odd prime. We study Mazur's conjecture on the growth of the Mordell--Weil ranks of an elliptic curve E/Q over Zp-extensions of an imaginary quadratic field, where p is a prime of good reduction for E. In particular, we obtain criteria that may be checked through explicit calculation, thus allowing for the verification of Mazur's conjecture in specific examples.
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