CM elliptic curves and vertically entangled 2-adic groups
Abstract
Consider the elliptic curve E given by the Weierstrass equation y2 = x3 - 11x - 14, which has complex multiplication by the order of conductor 2 inside Z[i]. It was recently observed in a paper of Daniels and Lozano-Robledo that, for each n ≥ 2, Q(μ2n+1) ⊂eq Q(E[2n]). In this note, we prove that this (a priori surprising) ``tower of vertical entanglements'' is actually more a feature than a bug: it holds for any elliptic curve E over Q with complex multiplication by any order of even discriminant.
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