A modified Lindstedt-Poincaré method for certain strongly non-linear oscillators

A modified Lindstedt-Poincare´(L-P) method for extending the validity of perturbation expansions to strongly non-linear oscillations of two-degree-of-freedom (DOF) systems is presented. A parameter transformation a = a (o, v0, v1) is adopted such that a strongly non-linear system with a large parame

The elliptic Lindstedt}PoincareH method is used/employed to study the periodic solutions of quadratic strongly non-linear oscillators of the form xK #c x# c x" f (x,. xR ), in which the Jacobian elliptic functions are employed instead of the usual circular functions in the classical Lindstedt}Poinc

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

Consider a non-linear oscillator modelled by the equation x#f (x)"0, x(0)"A, x(0)"0, (1)