Functional methods applied to the problems of non-linear periodic oscillations

The multiple scales method, developed for the systems with small non-linearities, is extended to the case of strongly non-linear self-excited systems. Two types of nonlinearities are considered: quadratic and cubic. The solutions are expressed in terms of Jacobian elliptic functions. Higher order ap

Communicated by A. Piskorek The mixed-Neumann problem for the non-linear wave equation m ua(u)(la,u)12 -IVu12) =f.(z) is studied. The function f , ( z ) = ~, , , &( z , E -~& ( z ) , E ) , E E [0, 11, K is finite, &(z,&,E) are 2s-periodic with respect to 0,. The existence of solution u, on a domain

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