Small limit cycles bifurcating in pendulum systems under trigonometric perturbations

Abstract

In this paper, we consider the bifurcation of small-amplitude limit cycles near the origin in perturbed pendulum systems of the form x= y, y=-(x)+ Q(x,y), where Q(x,y) is a smooth or piecewise smooth polynomial in the triple ((x),(x), y) with free coefficients. We obtain the sharp upper bound on the number of positive zeros of its associated first order Melnikov function near h=0 for Q(x,y) being smooth and piecewise smooth with the discontinuity at y=0, respectively.

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