Stability of periodic linear systems by a perturbation method

A multiple parameter perturbation method is developed to determine the Floquet eigenvalues and stability boundary of a linear discrete system that is described by a system of ordinary differential equations with periodic coefficients. In the method, the state of the system is determined by solving a

A method for calculating the solution, in Floquet form, to a system of linear di$erential equations with periodic parameters is developed. As a result, both the periodic and exponential parts of the solution are developed as power series in a small parameter, E. From this solution, approximate expre

The elliptic perturbation method is applied to the study of the periodic solutions of strongly quadratic non-linear oscillators of the form x¨+ c1 x + c2 x 2 = ef(x, x˙), in which the Jacobian elliptic functions are employed. The generalized Van der Pol equation with f(x, x˙) = m0 + m1 x -m2 x 2 is