Synthesis of Aircraft Modal Control Systems having Real or Complex Eigenvalues

T. R. Crossley; B. Porter

doi:10.1017/S0001924000053288

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The theory of modal control is concerned with the design of control loops for systems with governing equations which can be adequately approximated by linear vector-matrix equations of the form

where x is the system state vector, y is the control vector, A is the matrix of the uncontrolled system, and B is the control matrix.

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Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Porter, B. and Crossley, T. R. 1969. Modal Control of Linear Time-Invariant Discrete-Time Systems. Measurement and Control, Vol. 2, Issue. 8, p. T133.

PORTER, B. and CROSSLEY, T. R. 1970. Eigenvalue assignment in linear time-invariant closed-loop systems incorporating multi-variable three-term controllers†. International Journal of Control, Vol. 11, Issue. 2, p. 333.

Gould, L. Murphy, A. and Berkman, E. 1970. On the Simon-Mitter pole allocation algorithm--Explicit gains for repeated eigenvalues. IEEE Transactions on Automatic Control, Vol. 15, Issue. 2, p. 259.

PORTER, B. 1970. Synthesis of control policies for economic models: a continuous-time multiplier model†. International Journal of Systems Science, Vol. 1, Issue. 1, p. 1.

PORTER, B. and CROSSLEY, T. R. 1970. Synthesis of control policies for economic models: a discrete-time multiplier modelt†. International Journal of Systems Science, Vol. 1, Issue. 1, p. 9.

PORTER, B. and CROSSLEY, T. R. 1971. Synthesis of control policies for economic models: a continuous-time multiplier—accelerator model. International Journal of Systems Science, Vol. 1, Issue. 3, p. 191.

PORTER, B. and CROSSLEY, T. R. 1972. Synthesis of control policies for manufacturing systems using eigenvalue-assignment techniques †. International Journal of Systems Science, Vol. 3, Issue. 2, p. 117.

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Synthesis of Aircraft Modal Control Systems having Real or Complex Eigenvalues

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