Probability modeling for robustness of multivariate LQG designing based on ship lateral motion

Zhao Xi-ren; Peng Xiu-yan; Yin Zhong-feng

doi:10.1007/s11804-005-0053-9

Journal of Marine Science and Application ›› 2005, Vol. 4 ›› Issue (4) : 18 -22. DOI: 10.1007/s11804-005-0053-9

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Probability modeling for robustness of multivariate LQG designing based on ship lateral motion

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Abstract

The robustness of LQG designing for latitudinal movement of ship is mainly discussed, when its hydrodynamic parameters fluctuate around criterion value at random on the proportional distributing. When a given ship state at the speed of 18 kn and the course of 45° under Rank 5 state of sea, and the hydrodynamic parameters of the ship fluctuate at random on the proportional distributing with a range of ±10%, ±20%, ±30%, the robustness of multivariate LQG designing for ship is analyzed with applying the probability modeling of relative controlling effect. The result of simulating shows that when the hydrodynamic parameters of ship fluctuates the relative controlling effect of the LQG designing submit to normal distribution and the mean value of relative controlling effect has no remarkable changes comparing to that without perturbation of hydrodynamic parameter.

Keywords

hydrodynamic parameters / perturbation / LQG designing / statistic modeling

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Zhao Xi-ren, Peng Xiu-yan, Yin Zhong-feng. Probability modeling for robustness of multivariate LQG designing based on ship lateral motion. Journal of Marine Science and Application, 2005, 4(4): 18-22 DOI:10.1007/s11804-005-0053-9

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References

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[1]	Hanqiu Gao. Report of modeling and control for ship lateral motion [A]. 2004, Wuxi: Ship Research Center of China, 7-11 (in Chinese)

[2]	Keller J Y, Darouach M. Optimal two-stage Kalman filter in the presence of random. bias [J]. Automatica, 1997, 33(9): 1745-1748

[3]	Zheng-qi Sun. Theory of compute control and applicationg [M]. 2000, Beijing: Tsinghua University Press, (in Chinese)

[4]	Xiuyan Peng. Engineering random process [M]. 2000, Harbin: Harbin Engineering University Press, (in Chinese)

[5]	Nikouhah R, Willsky A S, Bernard C L. Kalman filtering and riccati equations for descriptor systems [J]. IEEE Trans. Automatic Control, 1992, 37(9): 106-108

[6]	Valappil J, Georgakis C. Systematic estimation of state noise statistics for extended kalman filters [J]. AiChE Journal/American Institute of Chemical Engineers, 2000, 46(2): 62-65

[7]	Gautier M, Poignet P. Extended Kalman filtering and weighted least squares dynamic identification of robot [J]. Control Engineering Practice, 2001, 9(12): 1361-1372

[8]	Grimble M J. LQG Feed forward/feedback stochastic optimal control and marine application [J]. Transactions of the Institute of Measurement and Control, 1999, 21(1): 30-31