Ramin Zaeim and Bijan Moaveni
[1] S. Skogestad and I. Postlethwaite, Multivariable feedback control: Analysis and design, 2nd ed. (Chichester, UK: Wiley, 2005). [2] B. Moaveni and A. Khakisedigh, Control configuration selection for multivariable plants (Berlin-Heidelberg: Springer, 2009). [3] T.J. McAvoy, Some results on dynamic interaction analysis of complex control systems, Industrial and Engineering Chemistry Process Design and Development, 22(1), 1983, 42–49. [4] Z.X. Zhu, Variable pairing selection based on individual and overall interaction measures, Industrial Engineering and Chemical Research, 35(11), 1996, 4091–4099. [5] K.E. Haggblom, Control structure analysis by partial relative gains, Proc. 36th Conference on Decision & Control, San Diego, CA, 1997, 2623–2624. [6] B. Manousiouthakis, B. Savage, and Y. Arkun, Synthesis of decentralized process control structure using concept of block relative gain, AIChE, 32(6), 1986, 991–1003. [7] K. Shimizu and M. Matsubara, Singular perturbation for the dynamic interaction measure, IEEE Transactions on Automatic Control, 30(8), 1985, 790–792. [8] A. Khakisedigh and A. Shahmansourian, Input–output pairing using balanced realizations, Electronics Letters, 32(21), 1996, 2027–2028. [9] A. Conley and M.E. Salgado, Gramian-based interaction measure, Proc. 39th Conference on Decision & Control, Sydney, NSW, 2000, 5020–5022. [10] M.E. Salgado and A. Conley, MIMO interaction measure and controller structure selection, International Journal of Control, 77(4), 2004, 367–383. [11] B. Wittemark and M.E. Salgado, Hankel-norm based interaction measure for input–output pairing, Proc. 15th IFAC World Congress on Automatic Control, Barcelona, Spain, 2002. [12] B. Moaveni and A. Khakisedigh, A new approach to compute the cross-Gramian matrix and its application in input–output pairing of linear multivariable plants, Journal of Applied Sciences, 8(4), 2008, 608–614. [13] M. Hovd and S. Skogestad, Pairing criteria for decentralized control of unstable plant, Industrial Engineering and Chemical Research, 33(9), 1994, 2134–2139. [14] V. Kariwala, J.F. Forbes, and S. Skogestad, μ-interaction measure for unstable systems, International Journal of Automation and Control, 1(4), 2007, 295–313. [15] K. Ogata, Discrete-time control systems, 2nd ed. (Prentice Hall, 1995). [16] S. Skogestad and M. Hovd, Simple frequency-dependent tools for control system analysis, structure selection and design, Automatica, 28(5), 1992, 989–996. [17] P. Grosdidier and M. Morari, Interaction measures for systems under decentralized control, Automatica, 22(3), 1986, 309–319. [18] N. Monshizadeh-Naini, A. Fatehi, and A. Khaki-Sedigh, Input–output pairing using effective relative energy array, Industrial Engineering and Chemical Research, 48(15), 2009, 7137–7144. [19] R.K. Wood and M.W. Berry, Terminal composition control of a binary distillation column, Chemical Engineering Science, 28(9), 1973, 1707–1717. [20] E.H. Bristol, On a new measure of interactions for multivariable process control, IEEE Transactions on Automation Control, 11(1), 1966, 133–134. [21] R. Zaeim and A. Zaeim, Decentralized control structure for linear stable and unstable plants based on the output controllability analysis, 18th IFAC World Congress, 18, Part 1.
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