Computation of the Rational Representation for Solutions of High-Dimensional Systems
Keywords:
rational univariate representation, high-dimensional ideal, maximally independent set, rational representation, irreducible component.Abstract
This paper deals with the representation of the solutions of a polynomial system, and concentrates on the high-dimensional case. Based on the rational univariate representation of zero-dimensional polynomial systems, we give a new description called rational representation for the solutions of a high-dimensional polynomial system and propose an algorithm for computing it. By this way all the solutions of any high-dimensional polynomial system can be represented by a set of so-called rational-representation sets.
Downloads
Published
2021-05-25
Abstract View
- 33279
Pdf View
- 2661
Issue
Section
Articles
How to Cite
Computation of the Rational Representation for Solutions of High-Dimensional Systems. (2021). Communications in Mathematical Research, 26(2), 119-130. https://global-sci.com/index.php/cmr/article/view/8651