The distribution of multiples of real points on an elliptic curve
Abstract
Given an elliptic curve E and a point P in E(R), we investigate the distribution of the points nP as n varies over the integers, giving bounds on the x and y coordinates of nP and determining the natural density of integers n for which nP lies in an arbitrary open subset of R2. Our proofs rely on a connection to classical topics in the theory of Diophantine approximation.
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