Injection into Orbit Optimization using Orthogonal Polynomials
Subject Areas : Mechanical EngineeringSedigheh Shahmirzaee Jeshvaghany 1 , Farshad Pazooki 2 , Alireza Basohbat Novinzaddeh 3
1 - Department of Mechanical and Aerospace Engineering,
Science and Research Branch, Islamic Azad University, Tehran, Iran
2 - Department of Mechanical and Aerospace Engineering,
Science and Research Branch, Islamic Azad University, Tehran, Iran.
3 - Department of Aerospace Engineering,
K.N.Toosi University of Technology, Tehran, Iran
Keywords:
Abstract :
[1] Rao, V. Anil., “A survey of numerical methods for optimal control,” (Preprint) AAS 09-334, 2009.
[2] Fahroo, F., and Ross, I. M., “Direct trajectory optimization by a Chebyshev pseudospectral method,” J. Guidance, Control and Dynamic, Vol. 25, No. 1, 2002, p. 160–166.
[3] Brusch, R. G., “Trajectory optimization for the Atlas/Centaur launch vehicle,” J. Spacecraft Rockets, Vol. 14, 1977, p. 550-555.
[4] Brauer, G. L., Cornick, D. E., and Stevenson, R., “Capabilities and applications of the program to optimize simulated trajectories (POST),” NASA CR-2770, 1977.
[5] Well, K. H., and Tandon, S. R., “Rocket ascent trajectory optimization via recursive quadratic programming,” J. Astron. Sci, Vol. 30, 1982, p. 101-116.
[6] Adimurthy, V., “Launch vehicle trajectory optimization,” Acta Astronautica, Vol. 15, No. 11, 1987, p. 845-850.
[7] Vathsal, S., and Swaminathan, R., “Minimax approach to trajectory optimization of multistage launch vehicles,” IEEE Transactions On Aerospace and Electronic Systems, IEEE. AES-13, Vol. 2, 1977, p. 179-187.
[8] Beltracchi, TJ., “Decomposition approach to solving the Ail-Up trajectory optimization problem,” Journal of Guidance, Control, and Dynamics, Vol. 15, 1992, p. 707-716.
[9] Weigel, N., and Well, K. H., “Dual payload ascent trajectory optimization with a splash-down constraint,” Journal of Guidance, Control, and Dynamics, Vol. 23, 2000, p. 45-52.
[10] Ping, Lu., “Inverse dynamics approach to trajectory optimization for an aerospace plane,” Journal of Guidance, Control, and Dynamics, Vol. 16, No.4, 1993, p. 726-732.
[11] Chen, C. F., and Hsiao, C. H., “Design of piecewise constant gains for optimal control via Walsh functions,” IEEE Transactions on Automatic Control, Vol. 20, No. 5, 1975, p. 596-603.
[12] Chen, W. L., and Shih, Y. P., “Analysis and optimal control of time-varying linear systems via Walsh functions,” International Journal of Control, Vol. 27, 1978, p. 917-932.
[13] Hsu, N. S., and Cheng, B., “Analysis and optimal control of time-varying linear systems via block-pulse functions,” International Journal of Control, Vol. 33, No. 6, 1981, p. 1107-1122.
[14] Hwang, C., and Shih, Y. P., “Optimal control of delay systems via block-pulse functions,” Journal of Optimization Theory and Applications, Vol. 45, No. 1, 1985, p.101- 112.
[15] Clement, P. R., “Laguerre functions in signal analysis and parameter identification,” Journal of the Franklin Institute, Vol. 313, No. 2, 1982, p. 85-95.
[16] Hwang, C., and Shih, Y. P., “Laguerre series direct method for variational problems,” Journal of Optimization Theory and Applications, Vol. 39, No. 1, 1983, p. 43-149.
[17] Hwang, C., and Chen, M. Y., “Analysis and optimal control of time-varying linear systems via shifted Legendre polynomials,” International Journal of Control, Vol. 41, No. 5, 1985, p. 1317-1330.
[18] Wang, ML., and Chang, R. Y., “Optimal control of lumped-parameter systems via shifted Legendre polynomial approximation,” Journal of Optimization Theory and Applications, Vol. 45, No. 2, 1985, p. 313-324.
[19] Paraskevopoulos, P. N., “Chebyshev series approach to system identification analysis and optimal control,” Journal of the Franklin Institute, Vol. 316, No. 1, 1983, p. 135-157.
[20] Chou, J. H., and Horng, I. R., “Application of Chebyshev polynomials to the optimal control of time-varying linear systems,” International Journal of Control, Vol. 41, No. 1, 1985, p. 135-144.
[21] Shahmirzaee, S. J., Novinzadeh, A. B., and Pazooki, F., “Multiple stage satellite launch vehicle ascent optimization using Chebyshev wavelets,” Aerospace Science and Technology, Vol. 46, 2015, p. 321-330.
[22] Mouroutsos, S. G., and Sparis, P .D., “Taylor series approach to system identification, analysis, and optimal control,” Journal of the Franklin Institute, Vol. 319, 1985, p. 359-371.
[23] Razzaghi, Mo., and Razzaghi, Me., “Taylor series direct method for variational problems,” Journal of the Franklin Institute, Vol. 325, No. 1, 1988, p. 125-131.
[24] Paraskevopoulos, P. N., Sparis, P. D., and Mouroutsos, S. G., “The Fourier series operational matrix of integration,” International Journal of Systems Science, Vol. 16, No. 2, 1985, p. 171-176.
[25] Razzaghi, M., “Fourier Series direct method for Variational Problems,” International Journal of Control, Vol. 48, No. 3, 1988, p. 887-895.
[26] Razzaghi, M., “Optimal Control of Linear time-varying systems via Fourier series,” Journal of Optimization Theory and Applications, Vol. 65, No. 2, 1990, p. 375-384.
[27] Razzaghi, M., and Marzban, H. R., “Direct method for variational problems via hybrid of block-pulse and Chebyshev functions,” Mathematical problems in Engineering, Vol. 6, 1999, p. 85-97.
[28] Handscomb, DC., Methods of numerical approximation, 1nd ed., Oxford university computing laboratory, Pergamon, press ltd, 1966, p. 50.
[29] Adibi, H., and Assari, P., “Chebyshev wavelet method for numerical solution of Fredholm integral equation of the first kind,” Mathematical problems in Engineering, ID 138408, 2010.
[30] EL-Gindy, T. M., and EL-Hawary, H. M., “A Chebyshev approximation for solving optimal control problems,” Computers & Math with Applic, Vol. 29, No. 6, 1995, p. 35-45.
[31] Afshari, H., Nasehi, H., Novinzadeh, A. B., and Roshanian, J., “A variational approach in determination of explicit neighboring optimal guidance law for injection into orbit,” International Review of Automatic Control, Vol. 1, No. 2, 2008, p. 248-257.
[32] Bryson, Jr. A., and Yu-Chi, Ho., Applied optimal control optimization, estimation, and control, 1nd ed., Massachusetts, Toronto, London, Blaisdell Publishing Company, 1969, p. 194.
