References
- Bryson , A. E. and Ho , Y.-C. 1975 . Applied Optimal Control , Washington , DC : Hemisphere Publishing Corporation .
- Feng , Z. G. and Teo , K. L. 2010 . “ Optimal feedback control for stochastic impulsive linear systems subject to poisson processes ” . In Optimization and Optimal Control: Theory and Applications , Edited by: Altannar , Chinchuluun , Pardalos , Panos M. , Rentsen , Enkhbat and Tseveendorj , Ider . 241 – 258 . New York : Springer .
- Feng , Z. G. , Teo , K. L. and Rehbock , V. 2009 . A smoothing approach for semi-infinite programming with projected Newton-type algorithm . J. Ind. Manag. Optim. , 5 : 141 – 151 . (doi:10.3934/jimo.2009.5.141)
- Goberna , M. A. and López , M. A. 2001 . Semi-Infinite Programming: Recent Advances , Boston : Kluwer Academic Publishers .
- Goh , C. J. and Teo , K. L. 1988 . Control parametrization: A unified approach to optimal control problems with general constraint . Automatica , 24 : 3 – 18 . (doi:10.1016/0005-1098(88)90003-9)
- Hettich , R. and Kortanek , K. O. 1993 . Semi-infinite programming: Theory, methods, and applications . SIAM Rev. , 35 : 380 – 429 . (doi:10.1137/1035089)
- Jennings , L. S. , Fisher , M. E. , Teo , K. L. and Goh , C. J. 1997 . MISER3 Optimal Control Software (Version 2): Theory and User Manual Centre for Applied Dynamics Optimization, The University of Western Australia, Perth, Australia
- Jiang , C. , Teo , K. L. , Loxton , R. and Duan , G. R. 2012 . A neighboring extremal solution for an optimal switched impulsive control problem . J. Ind. Manag. Optim. , 8 ( 3 ) : 591 – 609 . (doi:10.3934/jimo.2012.8.591)
- Li , D. H. , Qi , L. Q. , Tam , J. and Wu , S. Y. 2004 . A smoothing Newton method for semi-infinite programming . J. Global Optim. , 30 : 169 – 194 . (doi:10.1007/s10898-004-8266-z)
- Liu , L. X. , Liu , L. Y. and Wang , C. F. 2011 . Smoothing Newton methods for symmetric cone linear complementarity problems with the Cartesian property programming . J. Ind. Manag. Optim. , 7 : 53 – 66 . (doi:10.3934/jimo.2011.7.53)
- Ma , C. , Li , X. , Yiu , K. F.C. , Yang , Y. J. and Zhang , L. S. 2012 . On an exact penalty function method for semi-infinite programming problems . J. Ind. Manag. Optim. , 8 ( 3 ) : 705 – 726 . (doi:10.3934/jimo.2012.8.705)
- Ni , Q. , Ling , C. , Qi , L. Q. and Teo , K. L. 2006 . A truncated projected Newton-type algorithm for large-scale semi-infinite programming . SIAM J. Optim. , 16 ( 4 ) : 1137 – 1154 . (doi:10.1137/040619867)
- Qi , L. Q. and Sun , D. F. 2002 . Smoothing functions and smoothing Newton method for complementarity and variational inequality problems . J. Optim. Theory Appl. , 113 : 121 – 147 . (doi:10.1023/A:1014861331301)
- Qi , L. Q. , Sun , D. F. and Zhou , G. L. 2000 . A new look at smoothing Newton methods for nonlinear complementarity problems and box constrained variational inequalities . Math. Program. , 87 : 1 – 35 .
- Qi , L. Q. , Ling , C. , Tong , X. J. and Zhou , G. L. 2009 . A smoothing projected Newton-type algorithm for semi-infinite programming . Comput. Optim. Appl. , 42 : 1 – 30 . (doi:10.1007/s10589-007-9117-x)
- Reemtsen , R. 1991 . Discretization methods for the solution of semi-infinite programming problems . J. Optim. Theory Appl. , 71 : 85 – 103 . (doi:10.1007/BF00940041)
- Reemtsen , R. and Görner , S. 1998 . “ Numerical methods for semi-infinite programming: A survey ” . In Semi-Infinite Programming , Edited by: Reemtsen , R. and Rückmann , J. 195 – 275 . Boston : Kluwer Academic Publishers .
- Still , G. 2001 . Discretization in semi-infinite programming: The rate of convergence . Math. Program. , 91 : 53 – 69 .
- Sun , D. F. , Womersley , R. S. and Qi , H. D. 2002 . A feasible semismooth asymptotically Newton method for mixed complementarity problems . Math. Program. , 94 : 167 – 187 . (doi:10.1007/s10107-002-0305-2)
- Teo , K. L. and Wong , K. H. 1992 . Nonlinearly constrained optimal control problems . J. Aust. Math. Soc. B , 33 : 507 – 530 . (doi:10.1017/S0334270000007207)
- Teo , K. L. , Goh , C. J. and Wong , K. H. 1991 . A Unified Computational Approach to Optimal Control Problems , New York : Longman Scientific and Technical .
- Tong , X. J. and Zhou , S. Z. 2005 . A smoothing projected Newton-type method for semismooth equations with bound constraints . J. Ind. Manag. Optim. , 1 ( 2 ) : 235 – 250 . (doi:10.3934/jimo.2005.1.235)
- Vlassenbroeck , J. 1988 . A Chebyshev polynomial method for optimal control with state constraint . Automatica , 24 : 499 – 506 . (doi:10.1016/0005-1098(88)90094-5)
- Vlassenbroeck , J. and Dooren , R. V. 1988 . A Chebyshev technique for solving nonlinear optimal control problems . IEEE Trans. Automat. Control , 33 : 333 – 340 . (doi:10.1109/9.192187)
- Zhao , N. and Huan , Z. H. 2011 . A nonmonotone smoothing Newton algorithm for solving box constrained variational inequalities with a function . J. Ind. Manag. Optim. , 7 : 467 – 482 . (doi:10.3934/jimo.2011.7.467)