Input-to-state stability for a class of Lurie systems

We analyze input-to-state stability (ISS) for the feedback interconnection of a linear block and a nonlinear element. This study is of importance for establishing robustness against actuator nonlinearities and disturbances. In the absolute stability framework, we prove ISS from a positive real property of the linear block, by restricting the sector nonlinearity to grow unbounded as its argument tends to infinity. When this growth condition is violated, examples show that the ISS property is lost. The result is used to give a simple proof of boundedness for negative resistance oscillators, such as the van der Pol oscillator. In a separate application, we relax the minimum phase assumption of an earlier boundedness result for systems with nonlinearities that grow faster than linear.

[1]  N. Levinson,et al.  A general equation for relaxation oscillations , 1942 .

[2]  George Zames Zames G. On the input-output stability of time-varying nonlinear feedback systems. Parts I and II. IEEE Trans. Automat. Contr. AC-ll:228-38; 465-76, 1966 , 2004 .

[3]  A. Isidori Nonlinear Control Systems , 1985 .

[4]  M. L. Cartwright Forced oscillations in nonlinear systems , 1950 .

[5]  J. P. Lasalle,et al.  Absolute Stability of Regulator Systems , 1964 .

[6]  P. Hartman Ordinary Differential Equations , 1965 .

[7]  I. Sandberg A frequency-domain condition for the stability of feedback systems containing a single time-varying nonlinear element , 1964 .

[8]  Solomon Lefschetz,et al.  Stability by Liapunov's Direct Method With Applications , 1962 .

[9]  Petar V. Kokotovic,et al.  Boundedness without Absolute Stability in Systems with Stiffening Nonlinearities , 2002, Eur. J. Control.

[10]  Eduardo Sontag Smooth stabilization implies coprime factorization , 1989, IEEE Transactions on Automatic Control.

[11]  Alberto Isidori,et al.  Nonlinear control systems: an introduction (2nd ed.) , 1989 .

[12]  David Angeli,et al.  Input-to-state stability of PD-controlled robotic systems , 1999, Autom..

[13]  G. Zames On the input-output stability of time-varying nonlinear feedback systems--Part II: Conditions involving circles in the frequency plane and sector nonlinearities , 1966 .

[14]  Luca Zaccarian,et al.  On finite gain Lp stability of nonlinear sampled-data systems , 2003, Syst. Control. Lett..

[15]  Eduardo Sontag,et al.  On Finite-Gain Stabilizability of Linear Systems Subject to Input Saturation , 1996 .

[16]  I. W. Sandberg,et al.  On the L 2 -boundedness of solutions of nonlinear functional equations , 1964 .