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FAST CALCULATION OF ALL STABILIZING GAINS FOR DISCRETE-TIME SYSTEMS

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Abstract (2. Language): 
In this paper, two methods for calculating all stabilizing gains for discrete-time systems are given. The first method focuses on converting the problem using a bilinear transformation and then applying a previously developed theorem for continuous time systems. Unlike previous results, the method introduced here does not use the Generalised Hermite-Biehler Theorem and therefore provides a computational advantage. The second method demonstrates the use of Chebyshev Polynomials in the solution of the problem.
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REFERENCES

References: 

[1] Ackermann, J., Kaesbauer, D., Bajcinca, N., “Discrete-Time Robust PID And Three Term Control”, XV IFAC World Congress, Barcelona, 2002.
[2] Datta, A., Ho, M.T., Bhattacharyya S.P., Structure and Synthesis of PID Controllers, Springer, London, UK, 2000.
[3] Ho, M.T., Datta, A., Bhattacharyya S.P., “ A Linear Programming Characterization Of All Stabilizing PID Controllers”, Proceedings of the Amer. Contr. Conf., pp. 3922-3928, 1997.
[4] Keel, L., Bhattacharyya S.P., “Root Counting and Phase Unwrapping With Respect To The Unit circle with applications”, Proc of the 40th IEEE Conf. on Decision and Control, Orlando, Florida USA, pp. 3459-3464, 2001.
[5] Keel, L., Bhattacharyya S.P., “Root Counting and Phase Unwrapping Stability And Stabilization Of Discrete Time Systems”, Linear Algebra And Its Applications, Vol. 351, No. 352, pp. 501-517, 2002.
[6] Munro, N., Söylemez, M.T., Baki, H., “Computation Of D-Stabilizing Low-Order Compensators”, Control Systems Centre Report, 882, UMIST Manchester, 1999. Nevra BAYHAN, Mehmet Turan SÖYLEMEZ
Fast Calculation Of All Stabilizing Gains For Discrete-Time Systems
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[7] Munro, N., Söylemez, M.T.,“Fast Calculation Of Stabilizing PID Controllers For Uncertain Parameter Systems”, IFAC ROCOND, Prague, Czech Republic , 2000.
[8] Söylemez, M.T., Munro, N., Baki, H., “Fast Calculation Of Stabilizing PID Controllers”, Automatica, Vol: 39, No: 1, pp. 121-126, 2003.
[10] Fox, L., Parker, I.B., Chebyshev Polynomials in Numerical Analysis,
[9] Xu, H., Datta, A., Bhattacharyya S.P., “Computation Of All Stabilizing PID Gains For Digital Control Systems”, IEEE Transactions On Automatic Control. Vol: 46 No: 4, pp. 647-652, 2001. Oxford University Press, London, 21-64, 1968.

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