A family of oscillating generalized Hamiltonian systems

In this paper we introduce a method for generating stable and robust oscillations in nonlinear systems. The oscillations are associated to a limit cycle that is produced in a second order subsystem. Then the controller is extended to the full system by backstepping. A remarkable property of the introduced method is that it leads to a generalized Hamiltonian structure and to a Lyapunov function which guarantees the stability and robustness of the system. Copyright (C) 2003 IFAC.