Robust control of a class of uncertain nonlinear systems

We consider a control design problem for a class of mismatched uncertain systems. The uncertainty is (possibly fast) time-varying. A new way of characterizing the structure of uncertainty is submitted. A class of robust controls, which is based on the possible bound of uncertainty, is proposed. The

Generalized matching conditions are defined for nonlinear uncertain systems, under which a procedure of designing robust control is proposed using Lyapunov direct method to achieve three kinds of global stability results.

This paper considers the problem of robust disturbance attenuation for a class of systems with both Lipschitz bounded and nonlinear uncertainties. The nonlinear uncertainty is assumed to satisfy a 'matching condition' and bounded by a known nonlinear function. The Lipschitz bounded one could be with

In this paper, we propose an adaptive controller for a class of first order nonlinear systems: ~ = -O\*rf(x)b'u, subject to bounded input and output disturbances. Unmodelled dynamics are also considered in the stability analysis. A dead zone in the parameters update law is used. The dead zone size d