PERIODIC RESPONSE OF PIECEWISE NON-LINEAR OSCILLATORS UNDER HARMONIC EXCITATION

Vibration isolators having non-linearity in both stiffness and damping terms are analyzed under harmonic excitations. Isolators with symmetric as well as asymmetric restoring forces are considered. The method of harmonic balance is used to obtain the steady state, harmonic response and transmissibil

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

A linear stability theory for non-linear periodic solutions is presented in which higher order phase-integral asymptotic approximations are used. The stability matrix is derived in an exact formalism which combines Floquet and phase-integral theory. The periodic responses are assumed given in analyt

The Du$ng oscillator under external non-Gaussian excitations is investigated by means of statistical linearization. The input process is modelled as a polynomial of a Gaussian process or as a renewal-driven impulse process. Four criteria of statistical linearization are considered. The interarrival