Lower bounds for heights on some algebraic dynamical systems
Abstract
Let v be a finite place of a number field K and write Knr,v for the maximal field extension of K in which v is unramified. The purpose of this paper is split up into two parts. The first one generalizes a theorem of Pottmeyer: If E is an elliptic curve defined over K with split multiplicative reduction at v, then the N\'eron-Tate height of a non-torsion point P∈ E(K) is bounded from below by C / ev(P)2 ev(P)+1, where C>0 is an absolute constant and ev(P) is the maximum of all ramification indices ew(K(P) K) with w v. Among other things, we refine this result by showing that given a simple abelian variety A defined over K that is degenerate at v, the N\'eron-Tate height of a non-torsion point P∈ A(K) is at least C / lcmw v \ew(K(P) K)\2, where C>0 is an absolute constant. We then give applications towards Lehmer's conjecture. Next, we provide the first examples of polynomials φ∈ K[X] of degree at least 2 so that the canonical height hφ of any point in 1(Knr,v) is either 0 or bounded from below by an absolute positive constant.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.