Soumyadip Sahu
Published 2018-06-18Version 1
Let $E$ be an elliptic curve without complex multiplication defined over a number field $K$ which has at least one real embedding. The field $F$ generated by all torsion points of $E$ over $K$ is an infinite, non-abelian Galois extension of the ground field which has unbounded, wild ramification above all primes. Following the treatment in 'Small Height And Infinite Nonabelian Extensions' by P. Habegger we prove that the absolute logarithmic Weil height of an element of $F$ is either zero or bounded from below by a positive constant depending only on $E$ and $K$. We also show that the N\'eron-Tate height has a similar gap on $E(F)$. In appendix-A we have included some new results about Galois properties of division points of formal groups which are generalizations of results proved in chapter 2. This work is my M.Sc. thesis submitted to Chennai Mathematical Institute.
Comments: As of now, the proof of a technical lemma is incomplete (see lemma 2.3.7 and appendix-B). Hence strictly speaking, we have proved the results mentioned here assuming the statement of lemma 2.3.7
Small Height and Infinite Non-Abelian Extensions
Benford's Law for Traces of Frobenius on Newforms with Complex Multiplication
Apéry-like numbers and families of newforms with complex multiplication
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