A new construction for Melnikov chaos in piecewise-smooth planar systems

Abstract

In this paper we consider a piecewise smooth 2-dimensional system \[ x=g (x)+g(t,x,) \] where >0 is a small parameter and f is discontinuous along a curve 0. We assume that 0 is a critical point for any ≥ 0, and that for =0 the system admits a trajectory γ(t) homoclinic to 0 and crossing transversely 0 in γ(0). In a previous paper we have shown that, also in an n-dimensional setting, the classical Melnikov condition is enough to guarantee the persistence of the homoclinic to perturbations, but more recently we have found an open condition, a geometric obstruction which is not possible in the smooth case, which prevents chaos for 2-dimensional systems when g is periodic in t. In this paper we show that when this obstruction is removed we have chaos as in the smooth case. The proofs involve a new construction of the set from which the chaotic pattern originates. The results are illustrated by examples.