Homoclinic bifurcations in self-excited oscillators

Dynamics and bifurcations of a class of single-degree-of-freedom self-excited oscillators with an impact damper have been studied. The basic motivation is to determine a persistent bifurcation structure of co-dimension one which is independent of the exact functional form of the self-excitation mech

## Abstract Perturbation of a single‐degree‐of‐freedom conservative oscillator leads to the emergence and vanishing of periodic solutions and to various types of self‐excited oscillations. Using techniques from dynamical systems theory, in particular a certain Poincaré map, we establish the presenc

Based on an mverted pendulum impacting on rigid walls under external periodm excitation, a class of nonhnear impact oscillators is discussed for its homochnic bifurcation The Melmkov method established for smooth dynamical systems is extended to be applicable to the nonsmooth one For nonlinear Impac

Severd amangements are described in which one part of an oscillatory system is a jine wire heated by an electric current. Periodic cooling occurs as the wire movea through the surrounding air, ard as a result the length of the wCe changes. Uruler proper condi.%ms, the amplitude of oscillation will g