NON-LINEAR DYNAMICS AND CONTROL OF CHAOS FOR A TACHOMETER

The dynamic behaviors of a damped satellite with partially-filled liquid which is subjected to external disturbance are studied in this paper. The Lyapunov direct method is used to obtain conditions of stability of the equilibrium point of the system. A co-dimension one bifurcation analysis for the

The dynamic behavior of a physical pendulum system of which the support is subjected to both rotation and vertical vibration are studied in this paper. Both analytical and computational results are employed to obtain the characteristics of the system. By using Lyapunov's direct method the conditions

In this work we show that the now standard lumped non-linear enhancement of root-locus design still persists for a non-linear distributed parameter boundary control system governed by a scalar viscous Burgers' equation. Namely, we construct a proportional error boundary feedback control law and show

This paper deals with the development of computational schemes for the dynamic analysis of non-linear elastic systems. The focus of the investigation is on the derivation of unconditionally stable time-integration schemes presenting high-frequency numerical dissipation for these types of problem. At

The aim of this paper is to introduce the theory and techniques of non-linear discrete-time dynamics to the non-specialist and to describe some of the ways in which this material has been applied to the study of sigma-delta modulators. It is aimed at readers who are familiar with sigma-delta systems