WEAK NON-LINEARITY EFFECT ON STOCHASTIC PARAMETRIC RESONANCE

Non-linear vibration of rotating thin circular rings under parametric excitation is analyzed. First, a geometrical discretization is performed by applying an energy principle. The resulting dynamical model involves two degrees of freedom, representing the vibration amplitudes of two in-plane flexura

A simple, paradigmatic, model is used to illustrate some general properties of effects subsumed under the label "stochastic resonance." In particular, analyses of the transparent model show that 1) a small amount of noise added to a much larger signal can greatly increase the response to the signal,

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

The non-linear dynamic interaction between the impact of the "rst asymmetric liquid sloshing mode, represented by an equivalent pendulum, and the elastic structural dynamics is examined in the neighborhood of simultaneous occurrence of parametric and internal resonance conditions. The analytical mod