Computing cardinalities of Q-curve reductions over finite fields

François Morain; Charlotte Scribot; Benjamin Smith

doi:10.1112/S1461157016000267

Computing cardinalities of Q-curve reductions over finite fields

François Morain
, Charlotte Scribot
, Benjamin Smith

Ministère de l'Éducation nationale

Research output: Contribution to journal › Article › peer-review

Abstract

We present a specialized point-counting algorithm for a class of elliptic curves over F_p2 that includes reductions of quadratic Q-curves modulo inert primes and, more generally, any elliptic curve over F_p2 with a low-degree isogeny to its Galois conjugate curve. These curves have interesting cryptographic applications. Our algorithm is a variant of the Schoof-Elkies-Atkin (SEA) algorithm, but with a new, lower-degree endomorphism in place of Frobenius. While it has the same asymptotic asymptotic complexity as SEA, our algorithm is much faster in practice.

Original language	English
Pages (from-to)	115-129
Number of pages	15
Journal	LMS Journal of Computation and Mathematics
Volume	19
Issue number	A
DOIs	https://doi.org/10.1112/S1461157016000267
Publication status	Published - 1 Jan 2016

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N2 - We present a specialized point-counting algorithm for a class of elliptic curves over Fp2 that includes reductions of quadratic Q-curves modulo inert primes and, more generally, any elliptic curve over Fp2 with a low-degree isogeny to its Galois conjugate curve. These curves have interesting cryptographic applications. Our algorithm is a variant of the Schoof-Elkies-Atkin (SEA) algorithm, but with a new, lower-degree endomorphism in place of Frobenius. While it has the same asymptotic asymptotic complexity as SEA, our algorithm is much faster in practice.

AB - We present a specialized point-counting algorithm for a class of elliptic curves over Fp2 that includes reductions of quadratic Q-curves modulo inert primes and, more generally, any elliptic curve over Fp2 with a low-degree isogeny to its Galois conjugate curve. These curves have interesting cryptographic applications. Our algorithm is a variant of the Schoof-Elkies-Atkin (SEA) algorithm, but with a new, lower-degree endomorphism in place of Frobenius. While it has the same asymptotic asymptotic complexity as SEA, our algorithm is much faster in practice.

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JO - LMS Journal of Computation and Mathematics

JF - LMS Journal of Computation and Mathematics

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Computing cardinalities of Q-curve reductions over finite fields

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