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3. Huang, H., Ma, Y.J., et al.: Method to reduce the speed ripples of single rotator
compressor of air conditioner in low frequency. Electric Machines and Control 15(3),
98-102 (2011)
4. Biegler, L.T., Grossmann, I.E.: Retrospective on optimization. Computers and
Chemical Engineering 28(8), 1169-1192 (2004)
5. Chachuat, B., Mitsos, A., Barton, P.I.: Optimal design and steady-state opera-
tion of micro power generation employing fuel cells. Chemical Engineering Sci-
ence 60(16), 4535-4556 (2005)
6. Michaei, B., Jesus, R.G.: Optimal control for linear systems with multiple time
delays in control input. IEEE Transactions on Automatic Control 51(1), 91-96
(2006)
7. Teo, K.L., Goh, C.J., Wong, K.H.: A Unified Computational Approach to Optimal
Control Problems. Longman Scientific and Technical, New York (1991)
8. Biegler, L.T.: Solution of dynamic optimization problems by successive quadratic
programming and orthogonal collocation. Computers and Chemical Engineer-
ing 8(3), 243-248 (1984)
9. Luus, R.: Optimal control by dynamic programming using accessible grid points
and region contraction. Hungarian Journal of Industrial Chemistry 17(4), 523-543
(1989)
10. Rajesh, J., Gupta, K., Kusumakar, H.K., et al.: Dynamic optimization of chemical
processes using ant colony framework. Computers and Chemical Engineering 25(6),
583-595 (2001)
11. Wang, L.Y.: Modelling and optimization method based on control parameterization
in purification process of zinc hydrometallurgy. Central South University, Changsha
(2009)
12. Chen, N., Shen, X.Y., Gui, W.H., et al.: Control parameterization method of lin-
ear systems with multiple time-delays. Control Theory and Applications 28(8),
1099-1104 (2011)
13. Chen, B.S.: Electric drive automatic control system (The third version). China
Machine Press, Beijing (2003)
14. Goh, C.J., Teo, K.L.: Control parametrization: A unified approach to optimal con-
trol problem with general constraints. Automatica 24(1), 3-18 (1988)
15. Schittkowski, K.: NLPQLP: A fortran Implementation of a Sequential Quadratic
Programming Algorithm with Distributed and Non-monotone Line Search. Uni-
versity of Bayreuth, Bayreuth (2004)
16. Schittkowski, K.: NLPQLP: A fortran subroutine solving constrained nonlinear
programming problems. Annals of Operations Research 5(4), 485-500 (1986)
17. Schittkowski, K., Zillober, C., Zotemantel, R.: Numerical comparison of nonlinear
programming algorithm for structural optimization. Structural Optimization 7(1),
1-19 (1994)
18. Schittkowski, K.: Solving nonlinear programming problems with very many con-
straints. Optimization 25(2), 179-196 (1992)
19. Schittkowski, K.: Parameter estimation in systems of nonlinear equations. Nu-
merische Mathematik 68(1), 129-142 (1994)
20. Sirisena, H.R., Chou, F.S.: An ecient algorithm for solving optimal control prob-
lems with linear terminal constraints. IEEE Transactions on Automatic Con-
trol 21(2), 275-277 (1976)
21. Sirisena, H.R.: Computation of optimal controls using a piecewise polynomial pa-
rameterization. IEEE Transaction on Automatic Control 18(4), 409-411 (1973)
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