Sciweavers

MP
2006

Minimizing Polynomials via Sum of Squares over the Gradient Ideal

14 years 7 days ago
Minimizing Polynomials via Sum of Squares over the Gradient Ideal
A method is proposed for finding the global minimum of a multivariate polynomial via sum of squares (SOS) relaxation over its gradient variety. That variety consists of all points where the gradient is zero and it need not be finite. A polynomial which is nonnegative on its gradient variety is shown to be SOS modulo its gradient ideal, provided the gradient ideal is radical or the polynomial is strictly positive on the real gradient variety. This opens up the possibility of solving previously intractable polynomial optimization problems. The related problem of constrained minimization is also considered, and numerical examples are discussed. Experiments show that our method using the gradient variety outperforms prior SOS methods. Key words. Polynomials
Jiawang Nie, James Demmel, Bernd Sturmfels
Added 14 Dec 2010
Updated 14 Dec 2010
Type Journal
Year 2006
Where MP
Authors Jiawang Nie, James Demmel, Bernd Sturmfels
Comments (0)