Global discrepancy and small points on elliptic curves
Abstract
Let E be an elliptic curve defined over a number field k. In this paper, we define the ``global discrepancy'' of a finite set Z of algebraic points on E which in a precise sense measures how far the set is from being adelically equidistributed. We then prove an upper bound for the global discrepancy of Z in terms of the average canonical height of points in Z. We deduce from this inequality a number of consequences. For example, we give a new and simple proof of the Szpiro-Ullmo-Zhang equidistribution theorem for elliptic curves. We also prove a non-archimedean version of the Szpiro-Ullmo-Zhang theorem which takes place on the Berkovich analytic space associated to E. We then prove some quantitative `non-equidistribution' theorems for totally real or totally p-adic small points. The results for totally real points imply similar bounds for points defined over the maximal cyclotomic extension of a totally real field.
Keywords
Cite
@article{arxiv.math/0507228,
title = {Global discrepancy and small points on elliptic curves},
author = {Matthew Baker and Clayton Petsche},
journal= {arXiv preprint arXiv:math/0507228},
year = {2007}
}
Comments
33 pages, 1 figure