Higher-Order Deflation for Polynomial Systems with Isolated Singular Solutions
Abstract
Given an approximation to a multiple isolated solution of a polynomial system of equations, we have provided a symbolic-numeric deflation algorithm to restore the quadratic convergence of Newton's method. Using first-order derivatives of the polynomials in the system, our method creates an augmented system of equations which has the multiple isolated solution of the original system as a regular root. In this paper we consider two approaches to computing the ``multiplicity structure'' at a singular isolated solution. An idea coming from one of them gives rise to our new higher-order deflation method. Using higher-order partial derivatives of the original polynomials, the new algorithm reduces the multiplicity faster than our first method for systems which require several first-order deflation steps. We also present an algorithm to predict the order of the deflation.
Cite
@article{arxiv.math/0602031,
title = {Higher-Order Deflation for Polynomial Systems with Isolated Singular Solutions},
author = {Anton Leykin and Jan Verschelde and Ailing Zhao},
journal= {arXiv preprint arXiv:math/0602031},
year = {2007}
}
Comments
19 pages