Improved Complexity Bounds for Counting Points on Hyperelliptic Curves
Number Theory
2018-06-08 v2 Symbolic Computation
Algebraic Geometry
Abstract
We present a probabilistic Las Vegas algorithm for computing the local zeta function of a hyperelliptic curve of genus defined over . It is based on the approaches by Schoof and Pila combined with a modeling of the -torsion by structured polynomial systems. Our main result improves on previously known complexity bounds by showing that there exists a constant such that, for any fixed , this algorithm has expected time and space complexity as grows and the characteristic is large enough.
Cite
@article{arxiv.1710.03448,
title = {Improved Complexity Bounds for Counting Points on Hyperelliptic Curves},
author = {Simon Abelard and Pierrick Gaudry and Pierre-Jean Spaenlehauer},
journal= {arXiv preprint arXiv:1710.03448},
year = {2018}
}
Comments
To appear in Foundations of Computational Mathematics