Title :
Triangular Decomposition for Algebraic and Geometric Computing
Author_Institution :
Lab. d´´Inf. de Paris 6, UPMC-CNRS, Paris, France
Abstract :
In this talk, we present several algorithms for decomposing systems of multivariate polynomials into triangular systems of various kinds. The algorithms have been efficiently implemented and successfully applied to numerous problems of scientific computing, ranging over computational polynomial algebra, automated geometric reasoning, solving systems of nonlinear equations, qualitative analysis of biological systems, and computer aided geometric design. We discuss some of the applications with a number of illustrative examples.
Keywords :
algebra; geometry; algebraic computing; geometric computing; multivariate polynomials; triangular decomposition; triangular systems; Algebra; Algorithm design and analysis; Application software; Biological systems; Biology computing; Nonlinear equations; Polynomials; Scientific computing;
Conference_Titel :
Symbolic and Numeric Algorithms for Scientific Computing, 2008. SYNASC '08. 10th International Symposium on
Conference_Location :
Timisoara
Print_ISBN :
978-0-7695-3523-4
DOI :
10.1109/SYNASC.2008.96
