Abstract

We consider a class of observable, minimum phase single-input, single-output nonlinear systems evolving in R/sup n/ with relative degree /spl rho/ and p uncertain differentiable time varying parameters /spl theta/(t), belonging to a known compact set /spl Omega//spl sub/R/sup p/, whose time derivatives /spl theta//spl dot/(t) are bounded, but are not restricted to be small or to have known bounds. We design a dynamic output feedback controller such that, for any initial condition: 1) all signals are bounded; 2) the effects of parameter uncertainties on the tracking error are arbitrarily attenuated; and 3) when /spl theta//spl dot/(t)/spl isin/L/sub 1/, asymptotic tracking is guaranteed with arbitrarily good transient performance. Adaptation may be switched off at any time, still retaining the closed-loop properties 1) and 2).

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