Shadow line distributions
Abstract
Let E be an elliptic curve over Q with Mordell--Weil rank 2 and p be an odd prime of good ordinary reduction. For every imaginary quadratic field K satisfying the Heegner hypothesis, there is (subject to the Shafarevich--Tate conjecture) a line, i.e., a free Zp-submodule of rank 1, in E(K) Zp given by universal norms coming from the Mordell--Weil groups of subfields of the anticyclotomic Zp-extension of K; we call it the shadow line. When the twist of E by K has analytic rank 1, the shadow line is conjectured to lie in E(Q)p; we verify this computationally in all our examples. We study the distribution of shadow lines in E(Q)p as K varies, framing conjectures based on the computations we have made.
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