Bogomolov property for Galois representations with big local image

Abstract

An algebraic extension of the rational numbers is said to have the Bogomolov property (B) if the absolute logarithmic Weil height of its non-torsion elements is uniformly bounded from below. Given a continuous representation of the absolute Galois group GK of a number field K, one says that has (B) if the subfield of Q fixed by ker\, has (B). We prove that, if :GK GLd(Zp) maps an inertia subgroup at a prime above p surjectively onto an open subgroup of GLd(Zp), then has (B). More generally, we show that if the image of inertia is open in the image of the decomposition group, the normal closure of the local image is sufficiently large in the global one, and a certain condition on the center of (GK) satisfied, then has (B). In particular, no assumption on the modularity of is needed, contrary to previous work of Habegger and Amoroso--Terracini. We provide several examples both in modular and non-modular cases. Our methods rely on a result of Sen comparing the ramification and Lie filtrations on the p-adic Lie group (GK).

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