Title :
Hierarchical Identification Principle and a Family of Iterative Methods
Author :
Feng Ding ; Ming Li ; Jiyang Dai
Author_Institution :
Control Sci. & Eng. Res. Center, Southern Yangtze Univ., Wuxi, China
Abstract :
In this paper, we extend the well-known Jacobi and Gauss-Seidel iterations to present a large family of iterative methods. The proposed methods are applied to develop iterative solutions to the matrix equation AXB = F and the generalized Sylvester matrix equation AXB + CXD = F by means of a hierarchical identification principle. We prove that the iterative solutions converge to the exact solutions for any initial values. The algorithms proposed require less storage capacity than the existing numerical ones. The iterative methods can be applied to system parameter identification problems.
Keywords :
Jacobian matrices; Lyapunov matrix equations; iterative methods; least squares approximations; parameter estimation; Gauss-Seidel iteration; Jacobi iteration; Lyapunov matrix equation; Sylvester matrix equation; estimation; gradient iteration; hierarchical identification principle; iterative methods; least squares; system parameter identification; Control engineering education; Educational technology; Equations; Field-flow fractionation; Gaussian processes; Iterative methods; Jacobian matrices; Laboratories; Nondestructive testing; Speech synthesis; Gauss-Seidel iteration; Jacobi iteration; Lyapunov matrix equation; Sylvester matrix equation; estimation; gradient iteration; hierarchical identification principle; identification; least squares;
Conference_Titel :
Control Conference, 2006. CCC 2006. Chinese
Conference_Location :
Harbin
Print_ISBN :
7-81077-802-1
DOI :
10.1109/CHICC.2006.280586
