Sciweavers

ICASSP
2011
IEEE

Global convergence of independent component analysis based on semidefinite programming relaxation

13 years 4 months ago
Global convergence of independent component analysis based on semidefinite programming relaxation
In the independent component analysis, polynomial functions of higher order statistics are often used as cost functions. However, such cost functions usually have many local minima, hence gradient-type and xed-point-type algorithms tend to be trapped into a nonglobal local minimum. Recently, the polynomial optimization method that guarantees global convergence has been developed, where the optimization problem is relaxed as a semide nite programming problem. In this paper, we apply the polynomial optimization method to the independent component analysis, and show the global convergence property. From some empirical studies, we further give a conjecture that the algorithm has polynomial time computational complexity.
Shotaro Akaho, Jun Fujiki
Added 20 Aug 2011
Updated 20 Aug 2011
Type Journal
Year 2011
Where ICASSP
Authors Shotaro Akaho, Jun Fujiki
Comments (0)