Publication detail

Stability Analysis of Nonlinear Control System

ŠVARC, I.

Original Title

Stability Analysis of Nonlinear Control System

Type

conference paper

Language

English

Original Abstract

The most powerful methods of systems analysis have been developed for linear control systems. For a linear control system, all the relationships between the variables are linear differential equations, usually with constant coefficients. But actual control systems usually contain some nonlinear elements. Three methods for stability analysis of nonlinear control systems will be introduced in this lecture: method of linearization, Lyapunov direct method and Popov criterion. Since stability analysis of nonlinear control systems is difficult task in engineering practice, these methods are made easier and tabulated. In the lecture we will show how the equations for nonlinear elements may be linearized. But the result is applicable only in a small enough region. When all the roots of the characteristic equation are located in the left half-plane, the system is stable. However that linearization fails when Re si ˇÜ 0 for all i, with Re si = 0 for some i. We can construct the table includes the nonlinear equations and their the linear approximation. Then it is easy to find out if the nonlinear system is or is not stable. Lyapunov direct method: LyapunovˇŻs method is a very powerful tool for studying the stability of equilibrium points. However, there is drawback of the method that we should be aware of. There is no systematic method for finding a Lyapunov function for a given system. We would like to eliminate the first drawback of LyapunovˇŻs method. This is the table of LyapunovˇŻs functions . Popov criterion: The Popov criterion is considered as one of the most appropriate criteria for nonlinear systems and it can be compared with the Nyquist criterion for linear systems. The sufficient condition for stabilityof nonlinear circuit is that the plot of G*(j¦Ř) should lie entirely to the right of the Popov line which crosses the real axis at -1/k at a slope 1/q (q is an arbitrary real number) . We can construct the table that will allow us to directly determine the stability of the nonlinear circuit with the transfer function G(s) and the nonlinearity that satisfies the slope k.

Keywords

Nonlinear control system, equilibrium points, phase-plane trajectory, Lyapunov method, Popov criterion; modified frequency response; linearization, global asymptotic stability (GAS).

Authors

ŠVARC, I.

RIV year

2006

Released

1. 1. 2006

Publisher

Equilibria,s.r.o. pro Technickou univerzitu v Košiciach

Location

Košice

ISBN

80-969224-6-7

Book

Modern Trends in Control

Edition number

1

Pages from

247

Pages to

256

Pages count

10

BibTex

@inproceedings{BUT19194,
  author="Ivan {Švarc}",
  title="Stability Analysis of Nonlinear Control System",
  booktitle="Modern Trends in Control",
  year="2006",
  number="1",
  pages="10",
  publisher="Equilibria,s.r.o. pro Technickou univerzitu v Košiciach",
  address="Košice",
  isbn="80-969224-6-7"
}