Single-factor lifting and factorization of polynomials over local fields
Number Theory
2015-03-19 v1
Abstract
Let be a separable polynomial over a local field. Montes algorithm computes certain approximations to the different irreducible factors of , with strong arithmetic properties. In this paper we develop an algorithm to improve any one of these approximations, till a prescribed precision is attained. The most natural application of this "single-factor lifting" routine is to combine it with Montes algorithm to provide a fast polynomial factorization algorithm. Moreover, the single-factor lifting algorithm may be applied as well to accelerate the computational resolution of several global arithmetic problems in which the improvement of an approximation to a single local irreducible factor of a polynomial is required.
Cite
@article{arxiv.1104.3181,
title = {Single-factor lifting and factorization of polynomials over local fields},
author = {J. Guàrdia and E. Nart and S. Pauli},
journal= {arXiv preprint arXiv:1104.3181},
year = {2015}
}
Comments
9 figures