MODIFIED MICKENS PROCEDURE FOR CERTAIN NON-LINEAR OSCILLATORS

An elliptic perturbation method is presented for calculating periodic solutions of strongly non-linear oscillators of the form x¨+ c1x + c3x 3 = ef(x, x˙), in which the Jacobian elliptic functions are employed instead of usual circular functions in the conventional perturbation procedure. Three type

The response of a non-linear oscillator of the form x¨+ f(A, B, x) = og (E, m, w, k, t), where f(A, B, x) is an odd non-linearity and o is small, for A Q 0 and B q 0 is considered. The homoclinic orbits for the unperturbed system are obtained by using Jacobian elliptic functions with the generalized

Many important dynamical systems can be modeled one-dimensional non-linear oscillators [1,2]. For information on the properties of such systems, a variety of analytical methods exist which can be used to construct approximations to the periodic solutions [3,4]. However, when very accurate solutions

This paper presents a power series approach to accurately obtain the damped separatrices for a class of unforced non-linear oscillators. This in turn delineates the basins of attraction of two or more stable attractors in the phase space. The method is illustrated by its applications to the unforced