A CRT algorithm for constructing genus 2 curves over finite fields
Abstract
We present a new method for constructing genus 2 curves over a finite field with a given number of points on its Jacobian. This method has important applications in cryptography, where groups of prime order are used as the basis for discrete-log based cryptosystems. Our algorithm provides an alternative to the traditional CM method for constructing genus 2 curves. For a quartic CM field K with primitive CM type, we compute the Igusa class polynomials modulo p for certain small primes p and then use the Chinese remainder theorem (CRT) and a bound on the denominators to construct the class polynomials. We also provide an algorithm for determining endomorphism rings of ordinary Jacobians of genus 2 curves over finite fields, generalizing the work of Kohel for elliptic curves.
Cite
@article{arxiv.math/0405305,
title = {A CRT algorithm for constructing genus 2 curves over finite fields},
author = {Kirsten Eisentraeger and Kristin Lauter},
journal= {arXiv preprint arXiv:math/0405305},
year = {2007}
}
Comments
16 pages. to appear in Proceedings of AGCT-10