English

Two-sources Randomness Extractors for Elliptic Curves

Cryptography and Security 2014-08-27 v2

Abstract

This paper studies the task of two-sources randomness extractors for elliptic curves defined over finite fields KK, where KK can be a prime or a binary field. In fact, we introduce new constructions of functions over elliptic curves which take in input two random points from two differents subgroups. In other words, for a ginven elliptic curve EE defined over a finite field Fq\mathbb{F}_q and two random points PPP \in \mathcal{P} and QQQ\in \mathcal{Q}, where P\mathcal{P} and Q\mathcal{Q} are two subgroups of E(Fq)E(\mathbb{F}_q), our function extracts the least significant bits of the abscissa of the point PQP\oplus Q when qq is a large prime, and the kk-first Fp\mathbb{F}_p coefficients of the asbcissa of the point PQP\oplus Q when q=pnq = p^n, where pp is a prime greater than 55. We show that the extracted bits are close to uniform. Our construction extends some interesting randomness extractors for elliptic curves, namely those defined in \cite{op} and \cite{ciss1,ciss2}, when P=Q\mathcal{P} = \mathcal{Q}. The proposed constructions can be used in any cryptographic schemes which require extraction of random bits from two sources over elliptic curves, namely in key exchange protole, design of strong pseudo-random number generators, etc.

Keywords

Cite

@article{arxiv.1404.2226,
  title  = {Two-sources Randomness Extractors for Elliptic Curves},
  author = {Abdoul Aziz Ciss},
  journal= {arXiv preprint arXiv:1404.2226},
  year   = {2014}
}
R2 v1 2026-06-22T03:46:07.686Z