Limit cycle oscillations and a perturbed harmonic oscillator

Switching Mode Limit-Cycle Resonant Oscillators constitute a distinct and useful class of systems in the field of oscillators. Previous works have described the oscillator), processes of such systems as being closely similar to those of other limit-cycle oscillators. The present paper shows analytic

As an inverse problem for relaxation oscillators modeled by the autonomous Lienard differential equation, we assume plausible exact expressions for the limit ´Ž . cycles in the phase plane which correspond to periodic solutions toward which all solutions converge, or from which they recede, as time

Conditions of the existence of limit cycles in a general two-stroke oscillation system are obtained. The general oscillation is a special kind of Liénard-type system with isoclines approaching both positive infinites or negative infinites as t → ±∞. The conditions for the uniqueness of the twostroke

The recurrance relation method is employed to determine the dynamic structure factor for the single harmonic oscillator and a linear chain of harmonic oscillators. Approximative schemes based on this approach are proposed. Comparison is made with exactly known results.