The Bogomolov property for p-supercuspidal eigenforms
Abstract
We prove a lower bound on the Weil height, the so-called Bogomolov property, for the algebraic extensions of Q cut out by the adelic Galois representations attached to certain eigenforms whose local component at a prime p is supercuspidal. To this end, we give a method for constructing metric inequalities over p-adic Lie extensions of fields over Q that are finitely ramified at p.
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