Title :
Stability of dynamical systems determined by differential inequalities with applications to nonlinear circuits
Author :
Wang, Kaining ; Michel, Anthony N.
Author_Institution :
Dept. of Electr. Eng., Notre Dame Univ., IN, USA
Abstract :
We develop a Lyapunov stability theory for finite dimensional continuous-time dynamical systems described by a system of first order ordinary differential inequalities. We utilize this theory to establish sufficient robust stability criteria for a large class of finite dimensional, continuous-time dynamical systems described by systems of ordinary differential equations. We demonstrate the applicability of the methodology advanced herein by means of a specific example which has been considered in the literature. In terms of computational complexity and conservatism of stability criteria, the present results frequently offer improvements over existing results
Keywords :
Lyapunov methods; circuit stability; computational complexity; continuous time systems; multidimensional systems; nonlinear dynamical systems; nonlinear network analysis; stability criteria; Lyapunov stability theory; computational complexity; dynamical systems; finite dimensional continuous-time systems; first order ordinary differential inequalities; nonlinear circuits; robust stability criteria; Circuit stability; Computational complexity; Differential equations; Integrated circuit modeling; Lyapunov method; Nonlinear circuits; Resistors; Robust stability; Stability criteria; Voltage;
Conference_Titel :
Circuits and Systems, 1993., Proceedings of the 36th Midwest Symposium on
Conference_Location :
Detroit, MI
Print_ISBN :
0-7803-1760-2
DOI :
10.1109/MWSCAS.1993.342966
