Distribution of the Sequence [m]P in Elliptic Curves

Abstract

Major controversy surrounds the use of Elliptic Curves in finite fields as Random Number Generators. There is little information however concerning the "randomness" of different procedures on Elliptic Curves defined over fields of characteristic 0. The aim of this paper is to investigate the behaviour of the sequence m=[m]P and then generalize to polynomial seuences of the form φm=[p(m)]P. We examine the behaviour of this sequence in different domains and attempt to realize for which points it is not equidistributed in C/. We will first study the sequence in the space of Elliptic Curves E(C) defined over the complex numbers and then reconsider our approach to tackle real valued Elliptic Curves. In the process we obtain the measure with respect to which the sequence is equidistributed in E(R). In Section 4 we prove that every sequence of points Pn=(xn,yn,1) equidistributed w.r.t. that measure is not equidistributed(1) with the obvious map xn\xn\.