On the behavior of periodic solutions of planar autonomous Hamiltonian systems with multivalued periodic perturbations

Abstract

Aim of the paper is to provide a method to analyze the behavior of T-periodic solutions x, >0, of a perturbed planar Hamiltonian system near a cycle x0, of smallest period T, of the unperturbed system. The perturbation is represented by a T-periodic multivalued map which vanishes as 0. In several problems from nonsmooth mechanical systems this multivalued perturbation comes from the Filippov regularization of a nonlinear discontinuous T-periodic term. Through the paper, assuming the existence of a T-periodic solution x for >0 small, under the condition that x0 is a nondegenerate cycle of the linearized unperturbed Hamiltonian system we provide a formula for the distance between any point x0(t) and the trajectories x([0,T]) along a transversal direction to x0(t).