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http://dx.doi.org/10.3796/KSFT.2013.49.2.153

A control allocation sterategy based on multi-parametric quadratic programming algorithm  

Jeong, Tae-Yeong (Training Ship Kaya, Pukyong National University)
Ji, Sang-Won (Department of Mechanical System Engineering, College of Engineering, Pukyong National University)
Kim, Young-Bok (Department of Mechanical System Engineering, College of Engineering, Pukyong National University)
Publication Information
Journal of the Korean Society of Fisheries and Ocean Technology / v.49, no.2, 2013 , pp. 153-160 More about this Journal
Abstract
Control allocation is an important part of a system. It implements the function that map the desired command forces from the controller into the commands of the different actuators. In this paper, the authors present an approach for solving constrained control allocation problem in vessel system by using multi-parametric quadratic programming (mp-QP) algorithm. The goal of mp-QP algorithm applied in this study is to compute a solution to minimize a quadratic performance index subject to linear equality and inequality constraints. The solution can be pre-computed off-line in the explicit form of a piecewise linear (PWL) function of the generalized forces and constrains. The efficiency of mp-QP approach is evaluated through a dynamic positioning simulation for a vessel by using four tugboats with constraints about limited pushing forces and found to work well.
Keywords
Vessel; Control allocation; Dynamic positioning; Mp-QP algorithm; Robust control;
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  • Reference
1 Baotic M. 2002. An efficient algorithm for multi-parametric quadratic programming. Technical Report AUT02-04. http://control.ethz.ch/- ?hybrid. Accessed 5 Aug 2012.
2 Bemporad A, Morari M, Dua V and Pistikopoulos EN. 2002. The explicit linear quadratic regulator for constrained systems. Automatica 38, 3-20.   DOI   ScienceOn
3 Fossen TI and Johansen TA. 2006. A survey of control allocation methods for ships and underwater vehicles. Proc Int Con Con Auto, 1-6.
4 Ji SW, Bui VP, Balachandran B and Kim YB. 2013. Robust control allocation design for marine vessel. Ocean Eng 63, 105-111.   DOI   ScienceOn
5 Johansen TA. 2004. Optimizing nonlinear control allocation. Proc Con Dec Con, 3435-3440.
6 Johansen TA, Fossen TI and Berge SP. 2004. Constrained nonlinear control allocation with singularity avoidance using sequential quadratic programming. IEEE Tran Con Sys Tech 12, 211-216.   DOI   ScienceOn
7 Johansen TA, Fossen TI and Tondel P. 2005. Efficient optimal constrained control allocation via multi-parametric programming. J Guid Con Dyn 28, 506-515.   DOI   ScienceOn
8 Kvasnica M, Grieder P and Baotic M. 2004. Multi-parametric toolbox (MPT). http://control.ee.ethz.ch/-mpt. Accessed 10 Aug 2012.
9 Lindfors I. 1993. Thrust allocation methods for the dynamic positioning system. Proc 10th Int Ship Con Symp, 93-06.
10 Sordalen OJ. 1997. Optimal thrust allocation for marine vessels. Con Eng Prac 5, 1223-1231.   DOI   ScienceOn
11 Tondel P, Johansen TA and Bemporad A. An algorithm for multi-parametric quadratic programming and explicit MPC solutions. Automatica 39. 489-497.