Title :
Stability analysis of a class of multidimensional systems
Author :
Chu, Tianguang ; Zhang, Cishen ; Xie, Lihua ; Yeng Chai Soh
Author_Institution :
Dept. of Mech. & Eng. Sci., Peking Univ., Beijing, China
Abstract :
This paper analyzes the stability of a class of discrete linear multidimensional (MD) systems, whose solutions are path dependent and may not be uniquely specified by initial conditions. Based on the concept of solvable Lie algebra and a new comparison principle, it presents a simple necessary and sufficient condition for exponential stability of the MD systems in terms of the spectral radius of the system matrices. This extends a previous result based on the pairwise commutativity of the system matrices. A numerical example is given to illustrate the present result.
Keywords :
Lie algebras; discrete systems; matrix algebra; multidimensional systems; stability; discrete linear multidimensional systems; solvable Lie algebra; spectral radius; stability analysis; system matrices; Algebra; Control systems; Manufacturing processes; Multidimensional systems; Paper technology; Partial differential equations; Research and development; Stability analysis; State-space methods; Virtual manufacturing;
Conference_Titel :
Decision and Control, 2003. Proceedings. 42nd IEEE Conference on
Print_ISBN :
0-7803-7924-1
DOI :
10.1109/CDC.2003.1272365
