A chaotic blue sky catastrophe in forced relaxation oscillations

This note points out that in a wide class of forced relaxation oscillators the hyperbolic behavior, which has up to now been known to exist only on small set, dominates in the Lebesgue sense in a wide class of relaxation oscillators. This note introduces the simplest physically realistic smooth syst

The coherent nature of chaos is investigated in a simple harmonic oscillator driven by the chaotic force. The resonance phenomena between a harmonic oscillator and a chaotic oscillator are discussed in two cases: (a) the bifurcation parameter of the chaotic force is modulated by the amplitude of the

We prove that a class of problems containing the classical periodically forced pendulum equation displays the main features of chaotic dynamics. The approach is based on the construction of multibump type heteroclinic solutions to periodic orbits by the use of global variational methods. © 2000 Édit

Brownian motion driven by a chaotic sequence of iterates of a map F(y), which may depend on a bifurcation parameter, is discussed: 6(t)= -yv(t)+ f(t), where f(t)= Kyn, ~ for nr < t <~ (n + 1)r (n = 0, 1,2 .... ) and y,,\_~ = F(y,,). The time evolution equation for the distribution function of the ve