On the averaging of a class of hybrid systems

Modeling abstraction and time-scale separation in the design of complex systems often leads to hybrid dynamics. Discontinuities in the continuous evolution of a hybrid system may however create difficulties in the formal analysis, as well as in numerical simulation and verification. Here we study a class of hybrid systems that are excited by high-frequency external signals. These systems arise in the modeling of switched power converters, mechanical systems with friction and quantized systems. For a quite general class of excitation signals, an averaging result is shown stating that the hybrid system can be approximated by a Lipschitz-continuous system. The approximation is in the order of the maximal repetition interval of the excitation signal.

[1]  R. M. Bass,et al.  Extensions of averaging theory for power electronic systems , 1994, Power Electronics Specialists Conference.

[2]  L. Iannelli,et al.  Dither for smoothing relay feedback systems: an averaging approach , 2002 .

[3]  Dragan Nesic,et al.  Input to state set stability for pulse width modulated control systems with disturbances , 2004, Syst. Control. Lett..

[4]  M. Egerstedt,et al.  On the regularization of Zeno hybrid automata , 1999 .

[5]  Karl Henrik Johansson,et al.  Self-oscillations and sliding in Relay Feedback Systems: Symmetry and bifurcations , 2001, Int. J. Bifurc. Chaos.

[6]  A. J. van der Schaft,et al.  Complementarity modeling of hybrid systems , 1998, IEEE Trans. Autom. Control..

[7]  K. Henrik,et al.  Limit Cycles with Chattering in Relay Feedback Systems , 1997 .

[8]  F. Vasca,et al.  Dither shape in the averaging of switched systems , 2004, Proceedings of the 2004 American Control Conference.

[9]  Babak Sedghi,et al.  Control Design of Hybrid Systems via Dehybridization , 2003 .

[10]  Karl Henrik Johansson,et al.  Dither for smoothing relay feedback systems , 2003 .

[11]  Asad A. Abidi,et al.  Spectral spurs due to quantization in Nyquist ADCs , 2004, IEEE Transactions on Circuits and Systems I: Regular Papers.

[12]  Seth R. Sanders,et al.  Quantization resolution and limit cycling in digitally controlled PWM converters , 2003 .

[13]  Carlos Canudas de Wit,et al.  A survey of models, analysis tools and compensation methods for the control of machines with friction , 1994, Autom..

[14]  W. P. M. H. Heemels,et al.  On solution concepts and well-posedness of linear relay systems , 2003, Autom..

[15]  G. Zames,et al.  Dither in nonlinear systems , 1976 .