Title :
Singular distributed parameter perturbation systems
Author :
Yang, Jian-Hui ; Gao, Jiang-Hua
Author_Institution :
Coll. of Bus. Adm., South China Univ. of Technol., Guangzhou, China
Abstract :
The generalized left inverse, the generalized Fourier transform and the square root of matrix are defined in this paper, the paper deals with singular distributed parameter perturbation systems described by coupled partial differential equations with singular matrix coefficients. Initial-value problem are considered on the basis of the generalized Fourier transform theorem to the singular distributed parameter systems, we obtain the solution of the systems and gives the acceptable initial-value conditions.
Keywords :
Fourier transforms; distributed parameter systems; initial value problems; matrix algebra; partial differential equations; singularly perturbed systems; generalized Fourier transform; generalized left inverse method; initial-value problem; partial differential equation; singular distributed parameter perturbation system; singular matrix coefficient; Cables; Conductors; Couplings; Distributed parameter systems; Educational institutions; Fourier transforms; Optical propagation; Partial differential equations; Resistance heating; Temperature distribution; Drazin inverse solution; Perturbation systems; generalized Fourier transform; generalized left inverse;
Conference_Titel :
Machine Learning and Cybernetics, 2005. Proceedings of 2005 International Conference on
Conference_Location :
Guangzhou, China
Print_ISBN :
0-7803-9091-1
DOI :
10.1109/ICMLC.2005.1527130
