Bit-size estimates for triangular sets in positive dimension
Symbolic Computation
2010-11-24 v1
Abstract
We give bit-size estimates for the coefficients appearing in triangular sets describing positive-dimensional algebraic sets defined over Q. These estimates are worst case upper bounds; they depend only on the degree and height of the underlying algebraic sets. We illustrate the use of these results in the context of a modular algorithm. This extends results by the first and last author, which were confined to the case of dimension 0. Our strategy is to get back to dimension 0 by evaluation and inter- polation techniques. Even though the main tool (height theory) remains the same, new difficulties arise to control the growth of the coefficients during the interpolation process.
Keywords
Cite
@article{arxiv.1008.3459,
title = {Bit-size estimates for triangular sets in positive dimension},
author = {Xavier Dahan and Abdulilah Kadri and Éric Schost},
journal= {arXiv preprint arXiv:1008.3459},
year = {2010}
}
Comments
37 pages