W. E. Schmitendorf scite author profile

We consider a class of linear systems in which there is time-varying uncertainty. These linear uncertain systems can be divided into two types. Systems in which the structure of the uncertainty satisfies certain matching conditions are called matched, and those systems in which the uncertainty does not satisfy the matching conditions are called mismatched. A linear control law is determined which produces tracking of dynamic inputs. The tracking error does not asymptotically decrease to zero because the systems are uncertain, instead the error is bounded. In the case of matched systems this error bound can be made arbitrarily small, and the system is said to practically track the input. In mismatched systems, the tracking error cannot be made arbitrarily small, and the system is said to ε-track the input. Previously published theory requires nonlinear controllers for practical tracking. Here, we derive a linear feedforward control law. Several examples illustrate the results.

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Null Controllability of Linear Systems with Constrained Controls

Schmitendorf¹,

Barmish²

1980

SIAM J. Control Optim.

162

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Necessary conditions and sufficient conditions for static minmax problems

Schmitendorf

1977

Journal of Mathematical Analysis and Applications

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Reduced-order H∞ and LQR control for wind-excited tall buildings

Yang

Schmitendorf

1998

Engineering Structures

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W. E. Schmitendorf

Analytical Dynamics of Discrete Systems

Design of a Linear Controller for Robust Tracking and Model Following

Null Controllability of Linear Systems with Constrained Controls

Necessary conditions and sufficient conditions for static minmax problems

Reduced-order H∞ and LQR control for wind-excited tall buildings

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