Title :
Stability and bifurcation analysis of differential-difference-algebraic equations
Author :
Chen, Luonan ; Aihara, Kazuyuki
Author_Institution :
Dept. of Electr. Eng. & Electron., Osaka Sangyo Univ., Daito, Japan
fDate :
3/1/2001 12:00:00 AM
Abstract :
This paper treats a nonlinear dynamical system with both continuous-time and discrete-time variables as a differential-difference-algebraic equation (DDA) or a hybrid dynamical system, presents a fundamental analyzing method of such a DDA system for local sampling, asymptotical stability, singular perturbations and bifurcations, and further shows that there exist four types of generic codimension-one bifurcations at the equilibria in contrast to two types in continuous-time dynamical systems and three types in discrete-time dynamical systems. Finally the theoretical results are applied to digital control of power systems as an example. Numerical simulations demonstrate that our results are useful
Keywords :
asymptotic stability; bifurcation; difference equations; nonlinear differential equations; nonlinear dynamical systems; perturbation techniques; asymptotical stability; bifurcation analysis; continuous-time variables; differential-difference-algebraic equations; discrete-time variables; generic codimension-one bifurcations; hybrid dynamical system; local sampling; nonlinear dynamical system; power systems; singular perturbations; stability analysis; Asymptotic stability; Bifurcation; Differential equations; Digital control; Nonlinear dynamical systems; Nonlinear equations; Power system simulation; Power system stability; Sampling methods; Stability analysis;
Journal_Title :
Circuits and Systems I: Fundamental Theory and Applications, IEEE Transactions on
