On the Amplitude of External Perurbation and Chaos via Devil's Staircasein Muthuswamy-Chua System

Abstract

We recently analyzed the voltage of the memristic circuit proposed by Muthuswamy and Chua by adding an external sinusoidal oscillation γω ω t to the y(t) iL(t), when the x(t) vC(t) is given by y(t)/C. When fs<fd we have observed that the H\"older exponent of the system with C=1 is larger than 1, and that of the system with C=1.2 is less than 1. The latter system is unstable, and the route to chaos via the devil's staircase is observed. Above the mode of fd=1, fs=1 observed at ω 0.5, we observed a mode of fd=1, fs=2 at ω 1.15 and 1.05, in the case of C=1 and 1.2, respectively, and a mode of fd=2, fs=3 at ω 0.85 and 0.78, in the case of C=1 and 1.2, respectively. At high frequency of fs, there is no qualitative difference in the stability of the oscillation for C=1 and C=1.2