Sensitivity analysis of nonlinear feedback systems

## Abstract A stability condition is developed for multivariable, nonlinear feedback systems. The method is based on a modified sector condition and is combined with a polynomial expansion of the nonlinear system to create viable approximations that can be exploited within the sector bound setting.

A practical method is presented for the analysis of limit cycles in multivariable feedback control systems having separable nonlinear elements. The limit cycles are found by use of a criterion generated by the stability-equation method. Numerical examples are given and compared to other methods in t

The stability of a general class of saturating nonlinear feedback system-s excited by bounded inputs is investigated. Explicit bounds are obtained on the magnit& and duration of the error signal when it shoots out front the unsaturated zone into the saturation zone. Thus, when the linear plant of th

Syst~mes lin6aires ~t r6action ~ sensibilit6 optimalement faible Optimale lineare Feedback systeme geringer Empfindlichkeit .l-IHae~Hble CI4CTeMbI C o6paTHO~ CB~I3blO HMe~o~He OI'ITHMa2IbHOMaYlylO qyBCTBHTeJIbHOCTb H. KWAKERNAAKI By choosing in the stochastic linear regulator problem the matrix whi

In this paper, the stability of nonlinear time-varying feedback systems is studied using a "passive operator" technique. The feedback system is assumed to consist of a linear time-invariant operator G(s) in the forward path and a nonlinear time-varying gain function f( • )K(t) in the feedback path.