Generalized Geographical Family and the Stability of Limit Cycles

The perturbation-incremental method is applied to the study of stability bifurcations of limit cycles and homoclinic (heteroclinic) bifurcations of strongly non-linear oscillators. The bifurcation parameters can be determined to any desired degree of accuracy.

The limit cycles of the generalized Rayleigh-Lie´nard oscillator X + AX + 2BX 3 + o(z 3 + z 2 X 2 + z 1 X 4 + z 4 X 2 )X = 0, for A q 0, B q 0, and A Q 0, B q 0 are studied by using the Jacobian elliptic functions with the generalized harmonic balance method. For given values of the parameters z i $

The generalized Rayleigh and van der Pol differential equations are given, respectively, by the following expressions [1-5]:

We consider a class of planar differential equations which include the Lie´nard differential equations. By applying the Bendixson-Dulac Criterion for '-connected sets we reduce the study of the number of limit cycles for such equations to the condition that a certain function of just one variable do