论文信息 - An LMI approach to stabilization of linear port-controlled Hamiltonian systems

An LMI approach to stabilization of linear port-controlled Hamiltonian systems

In this paper, it is shown that controllers for stabilizing linear port-controlled Hamiltonian (PCH) systems via interconnection and damping assignment can be obtained by solving a set of linear matrix inequalities (LMIs). Two sets of (almost) equivalent LMIs are proposed. In the first set, the interconnection and damping matrices do not appear explicitly, which makes it more difficult to directly manipulate those matrices. By requiring the system to have no uncontrollable pole at s = 0, the second set of LMIs, explicitly containing the interconnection and damping matrices, can be obtained. Taking into account the physical properties of the system, some prespecified structures can be imposed directly on those matrices.

[1] Arjan van der Schaft,et al. Passive output feedback and port interconnection , 1998 .

[2] Stephen P. Boyd,et al. Linear Matrix Inequalities in Systems and Control Theory , 1994 .

[3] Arjan van der Schaft,et al. Stabilization of port-controlled Hamiltonian systems via energy balancing , 1999 .

[4] E. Yaz. Linear Matrix Inequalities In System And Control Theory , 1998, Proceedings of the IEEE.

[5] A. Schaft,et al. On Representations and Integrability of Mathematical Structures in Energy-Conserving Physical Systems , 1999 .

[6] Romeo Ortega,et al. Stabilization of a class of underactuated mechanical systems via interconnection and damping assignment , 2002, IEEE Trans. Autom. Control..

[7] Arjan van der Schaft,et al. Interconnection and damping assignment passivity-based control of port-controlled Hamiltonian systems , 2002, Autom..

[8] Gill A. Pratt,et al. Legged robots at MIT: what's new since Raibert? , 2000, IEEE Robotics Autom. Mag..

[9] A. Schaft,et al. Port-controlled Hamiltonian systems : modelling origins and systemtheoretic properties , 1992 .

[10] Romeo Ortega,et al. Putting energy back in control , 2001 .

[11] Neville Hogan,et al. Impedance Control: An Approach to Manipulation: Part I—Theory , 1985 .

[12] M. Spong,et al. Stabilization of Underactuated Mechanical Systems Via Interconnection and Damping Assignment , 2000 .