English

A p-adic quasi-quadratic point counting algorithm

Number Theory 2008-06-27 v3 Algebraic Geometry

Abstract

In this article we give an algorithm for the computation of the number of rational points on the Jacobian variety of a generic ordinary hyperelliptic curve defined over a finite field of cardinality qq with time complexity O(n2+o(1))O(n^{2+o(1)}) and space complexity O(n2)O(n^2), where n=log(q)n=\log(q). In the latter complexity estimate the genus and the characteristic are assumed as fixed. Our algorithm forms a generalization of both, the AGM algorithm of J.-F. Mestre and the canonical lifting method of T. Satoh. We canonically lift a certain arithmetic invariant of the Jacobian of the hyperelliptic curve in terms of theta constants. The theta null values are computed with respect to a semi-canonical theta structure of level 2νp2^\nu p where ν>0\nu >0 is an integer and p=char(\Fq)>2p=\mathrm{char}(\F_q)>2. The results of this paper suggest a global positive answer to the question whether there exists a quasi-quadratic time algorithm for the computation of the number of rational points on a generic ordinary abelian variety defined over a finite field.

Keywords

Cite

@article{arxiv.0706.0234,
  title  = {A p-adic quasi-quadratic point counting algorithm},
  author = {Robert Carls and David Lubicz},
  journal= {arXiv preprint arXiv:0706.0234},
  year   = {2008}
}
R2 v1 2026-06-21T08:34:28.243Z