Sub-Linear Point Counting for Variable Separated Curves over Prime Power Rings
Abstract
Let with prime and let be a bivariate polynomial with degree and all coefficients of absolute value at most . Suppose also that is variable separated, i.e., for . We give the first algorithm, with complexity sub-linear in , to count the number of roots of over mod for arbitrary : Our Las Vegas randomized algorithm works in time , and admits a quantum version for smooth curves working in time . Save for some subtleties concerning non-isolated singularities, our techniques generalize to counting roots of polynomials in over mod . Our techniques are a first step toward efficient point counting for varieties over Galois rings (which is relevant to error correcting codes over higher-dimensional varieties), and also imply new speed-ups for computing Igusa zeta functions of curves. The latter zeta functions are fundamental in arithmetic geometry.
Cite
@article{arxiv.2102.01626,
title = {Sub-Linear Point Counting for Variable Separated Curves over Prime Power Rings},
author = {Caleb Robelle and J. Maurice Rojas and Yuyu Zhu},
journal= {arXiv preprint arXiv:2102.01626},
year = {2021}
}
Comments
18 pages, no figures. Submitted to a conference. Comments and questions welcome!