Chaotic motion versus stochastic excitation

In this paper, one considers dynamic chaotic/stochastic systems and the associated Gibbs set. The behavior of these sets leads one to characterize the systems and to calculate the values of the Kolmogorov entropy. The ultimate objective is to extend an approach typical of the statistical mechanics t

The shooting method is applied to prove that a pendulum with oscillatory forcing makes chaotic motions for certain parameters. The method is more intuitive than an using the PoincareÕ map and provides more information about when the chaos occurs. It proves that more chaotic solutions exit.

The non-linear motion of a symmetric gyro mounted on a vibrating base is investigated, with particular emphasis on its long-term dynamic behaviour for a wide range of parameters. A single modal equation is used to analyze the qualitative behavior of the system. External disturbance appears as vertic

Non-linear oscillators under harmonic and/or weak stochastic excitations are considered in this paper. Under harmonic excitations alone, an analytical technique based on a set of exponential transformations followed by harmonic balancing is proposed to solve for a variety of one-periodic orbits. The