Explicit Small Heights in Infinite Non-Abelian Extensions
Abstract
Let E be an elliptic curve over the rationals. We will consider the infinite extension Q(Etor) of the rationals where we adjoin all coordinates of torsion points of E. In this paper we will prove an explicit lower bound for the height of non-zero elements in Q(Etor) that are not a root of unity, only depending on the conductor of the elliptic curve. As a side result we will give an explicit bound for a small supersingular prime for an elliptic curve.
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