Pseudoprime reductions of Elliptic curves

Chantal David; Jie Wu

arXiv:1005.3871·math.NT·May 24, 2010

Pseudoprime reductions of Elliptic curves

Chantal David, Jie Wu

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Abstract

Let $E$ be an elliptic curve over $\F_{p}$ without complex multiplication, and for each prime $p$ of good reduction, let $n_{E} (p) = ∣ E (\F_{p}) ∣$ . Let $Q_{E, b} (x)$ be the number of primes $p \leq x$ such that $b^{n_{E} (p)} \equiv b (mod n_{E} (p))$ , and $π_{E, b}^{pseu} (x)$ be the number of {\it compositive} $n_{E} (p)$ such that $b^{n_{E} (p)} \equiv b (mod n_{E} (p))$ (also called elliptic curve pseudoprimes). Motivated by cryptography applications, we address in this paper the problem of finding upper bounds for $Q_{E, b} (x)$ and $π_{E, b}^{pseu} (x)$ , generalising some of the literature for the classical pseudoprimes \cite{Erdos56, Pomerance81} to this new setting.

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TopicsAnalytic Number Theory Research · Algebraic Geometry and Number Theory · Cryptography and Residue Arithmetic