Abstract
Output tracking of a reference signal (an absolutely continuous bounded function with essentially bounded derivative) is considered in a context of a class of nonlinear systems described by functional differential equations. The primary control objective is tracking with prescribed accuracy: given /spl lambda/ > 0 (arbitrarily small), ensure that, for every admissible system and reference signal, the tracking error e is ultimately smaller than /spl lambda/ (that is, /spl par/e(t)/spl par/ < /spl lambda/ for all t sufficiently large). The second objective is guaranteed transient performance: the evolution of the tracking error should be contained in a prescribed performance funnel F. Adopting the simple feedback control structure u(t) = -k(t)e(t), it is shown that the above objectives can be achieved if the gain k(t) = K/sub F/(t,e(t)) is generated by any continuous function K/sub F/ exhibiting two specific properties formulated in terms of the distance of e(t) to the funnel boundary.
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