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Multivariable Nyquist plot of discrete-time stationary optimal linear filters

Multivariable Nyquist plot of discrete-time stationary optimal linear filters

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© The Institution of Electrical Engineers
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The behaviour of the locus of the determinant of the optimal discrete-time stationary Kalman filter return difference matrix, as the z-transform variable traverses the unit circle, is considered. It is found that this locus does not enter a circle which is centered at the origin and whose radius is determined by the signal/noise ratio. This radius increases from zero, in the case where the measurements are free of noise, to one, in the case where all the components of the measurement noise vector have unbounded intensities.

Inspec keywords: discrete time systems; multivariable systems; optimal control; Nyquist diagrams; Kalman filters; Z transforms

Other keywords: optimal control; measurement noise; multivariable systems; optimal filters; z-transform; discrete time filter; Nyquist plot; linear filters; Nyquist diagrams; Kalman filter

Subjects: Information theory; Multivariable control systems; Stability in control theory; Integral transforms; Optimal control; Discrete control systems

References

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      • H.H. ROSENBROCK . (1974) , Computer-aided control system design.
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      • R.E. Kalman . When is a linear control system optimal?. Trans. ASME J. Basic Eng. , 51 - 60
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