Periodic-impact motions and bifurcations of a dual component system

A two-degree-of-freedom (d.o.f.) impact system with proportional damping is considered. The maximum displacement of one of the masses is limited to a threshold value by a rigid wall, which gives rise to a non-linearity in the system. A limiting case of a dynamical problem arising in the mechanical s

Two typical vibro-impact systems are considered. The periodic-impact motions and Poincare ´maps of the vibro-impact systems are derived analytically. A center manifold theorem technique is applied to reduce the Poincare ´map to a twodimensional one, and the normal form map associated with 1:4 strong

A two-degrees-of-freedom vibratory system with a constraint is considered. The constraint leads motions with impacts. Such models play an important role in the studies of mechanical systems with amplitude constraining stops. On the perfectly plastic impact condition, the dynamics of the vibro-impact