Title :
Stability of 2-D discrete systems described by the Fornasini-Marchesini second model
Author_Institution :
Fac. of Eng., Hiroshima Univ., Japan
fDate :
3/1/1997 12:00:00 AM
Abstract :
Based on the Fornasini-Marchesini second local state-space (LSS) model, criteria that sufficiently guarantee the asymptotic stability of 2-D discrete systems are given. A sufficient condition for a 2-D nonlinear discrete system to be free of overflow oscillations is then shown in the case when a 2-D discrete system is employed by saturation arithmetic. Finally, an upper bound on parameter variations which guarantees the asymptotic stability of a perturbed 2-D discrete system is considered. It is shown that the upper bound stated here is less conservative than the existing ones
Keywords :
Lyapunov matrix equations; asymptotic stability; discrete systems; multidimensional systems; nonlinear systems; stability criteria; state-space methods; 2D discrete systems; Fornasini-Marchesini second model; asymptotic stability; nonlinear discrete system; overflow oscillations free system; parameter variations; perturbed discrete system; saturation arithmetic; second local state-space model; upper bound; Arithmetic; Asymptotic stability; Equations; Finite wordlength effects; Stability criteria; Sufficient conditions; Symmetric matrices; Transfer functions; Two dimensional displays; Upper bound;
Journal_Title :
Circuits and Systems I: Fundamental Theory and Applications, IEEE Transactions on
