Title :
Stability analysis of 2-D systems
Author :
Fornasini, Ettore ; Marchesini, Giovanni
fDate :
12/1/1980 12:00:00 AM
Abstract :
A polynomial stability criterion for 2-D systems is taken as a starting point for introducing a frequency dependent Lyapunov equation. The Fourier analysis of its matrix solution leads to an infinite dimensional quadratic form which provides a Lyapunov function for the global state of the system. The Fourier coefficients are explicitly obtained as the sum of series involving the system matrices. The convergence of these series constitutes a necessary and sufficient stability condition, which generalizes the analogous condition for 1-D systems.
Keywords :
Digital filter stability; General circuits and systems; Lyapunov stability; Multidimensional (n-D) system; Circulators; Equations; Filters; Laboratories; Microwave devices; Physics; Quantum mechanics; Solid state circuits; Stability analysis; Stability criteria;
Journal_Title :
Circuits and Systems, IEEE Transactions on
DOI :
10.1109/TCS.1980.1084769
