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Review Article

Mathematical optimization in enhancing the sustainability of aircraft trajectory: A review

Ahmed W.A. HammadFaculty of Built Environment, UNSW Sydney, Sydney, Australia; Correspondence[email protected]
ORCID Iconhttp://orcid.org/0000-0001-6190-0078
ORCID Icon,
David ReySchool of Civil and Environmental Engineering, UNSW Sydney, Sydney, Australia;
,
Amani Bu-QammazSchool of Civil Engineering, Kuwait University, Kuwait;
,
Hanna GrzybowskaSchool of Civil and Environmental Engineering, UNSW Sydney, Sydney, Australia; ORCID Iconhttp://orcid.org/0000-0003-2614-5964
ORCID Icon &
Ali AkbarnezhadSchool of Civil Engineering, University of Sydney, Sydney, Australia
Pages 413-436 | Received 23 Apr 2018, Accepted 12 Jan 2019, Published online: 02 Apr 2019

References

  • Abdallah, L., Haddou, M., & Khardi, S. (2008). Optimization of operational aircraft parameters reducing noise emission. ArXiv:08044135 [math.OC].
  • Alam, S., Bui, L. T., Abbass, H. A., & Barlow, M. (2006). Pareto meta-heuristics for generating safe flight trajectories under weather hazards. In T.-D. Wang, X. Li, S.-H. Chen, X. Wang, H. Abbass, H. Iba, G.-L. Chen, X. Yao. (Eds.). Simulated evolution and learning, lecture notes in computer science (pp. 829–836). Berlin: Springer.
  • Antoine, N. E., & Kroo, I. M. (2005). Framework for aircraft conceptual design and environmental performance studies. Journals: The American Institute of Aeronautics and Astronautics, 43(10), 2100–2109. doi:10.2514/1.13017
  • Arnăutu, V., & Neittaanmäki, P. (2013). Optimal Control from Theory to Computer Programs. Springer Science & Business Media. Romania.
  • Askey, R., & Wilson, J. A. (1985). Some Basic Hypergeometric Orthogonal Polynomials that Generalize Jacobi Polynomials. RI: American Mathematical Society. USA.
  • Baranowski, L., Gadomski, B., Majewski, P., & Szymonik, J. (2016). Explicit “ballistic M-model”: a refinement of the implicit “modified point mass trajectory model.”. Bulletin of the Polish Academy of Sciences Technical Sciences, 64, 81–89. doi.org/10.1515/bpasts-2016-0010
  • Bard, J. F. (2013). Practical bilevel optimization: Algorithms and applications. Springer Science & Business Media. Dordrecht, Netherlands.
  • Barth, T. J., & Deconinck, H. (2003). High-order methods for computational physics. Brelin: Springer Science & Business Media.
  • Bellomo, N., Lods, B., Revelli, R., & Ridolfi, L. (2007). Generalized collocation methods: solutions to nonlinear problems. Springer Science & Business Media. Birkhauser, Boston.
  • Betts, J. T. (1999). A direct approach to solving optimal control problems. Computing in Science & Engineering, 1(3), 73–75. doi:10.1109/5992.764218
  • Betts, J. T. (1998). Survey of numerical methods for trajectory optimization. The Journal of Guidance, Control, and Dynamics, 21(2), 193–207. doi:10.2514/2.4231
  • Black, D. A., Black, J. A., Issarayangyun, T., & Samuels, S. E. (2007). Aircraft noise exposure and resident’s stress and hypertension: A public health perspective for airport environmental management. Journal of Air Transport Management, the Air Transport Research Society’s 10th Year Anniversary, Nagoya Conference, 13, 264–276. doi:10.1016/j.jairtraman.2007.04.003
  • Boeker, E. R., Dinges, E., He, B., Fleming, G., Roof, C. J., Gerbi, P. J., … Hemann, J. (2008). Integrated Noise Model (INM) Version 7.0 Technical Manual. U.S. Department of Transportation; Federal Aviation Administration Office of Environment and Energy.
  • Bonami, P., Olivares, A., Soler, M., & Staffetti, E. (2013). Multiphase mixed-integer optimal control approach to aircraft trajectory optimization. The Journal of Guidance, Control, and Dynamics, 36(5), 1267–1277. doi:10.2514/1.60492
  • Bongiorno, C., Gurtner, G., Lillo, F., Mantegna, R. N., & Miccichè, S. (2017). Statistical characterization of deviations from planned flight trajectories in air traffic management. Journal of Air Transport Managment, 58, 152–163. doi:10.1016/j.jairtraman.2016.10.009
  • Boussaïd, I., Lepagnot, J., & Siarry, P. (2013). A survey on optimization metaheuristics. Information Science, 237, 82–117. doi:10.1016/j.ins.2013.02.041
  • Bouttier, C., Babando, O., Gadat, S., Gerchinovitz, S., Laporte, S., & Nicol, F. (2017). Adaptive Simulated Annealing with Homogenization for Aircraft Trajectory Optimization, in: Operations Research Proceedings 2015, Operations Research Proceedings. Springer, Cham, pp. 569–574. doi.org/10.1007/978-3-319-42902-1_77
  • Bulirsch, M., & Stoer, W. (2013). Optimal control: calculus of variations, optimal control theory and numerical methods. Birkhäuser. Basel.
  • Burrows, J. W. (1983). Fuel-optimal aircraft trajectories with fixed arrival times. The Journal of Guidance, Control, and Dynamics., 6(1), 14–19. doi:10.2514/3.19796
  • Büskens, C., & Wassel, D. (2012). The ESA NLP Solver WORHP. In Modeling and optimization in space engineering, springer optimization and its applications (pp. 85–110). New York, NY: Springer. doi:10.1007/978-1-4614-4469-5_4
  • Byrd, R. H., Nocedal, J., & Waltz, R. A. (2006). Knitro: An integrated package for nonlinear optimization. In Large-scale nonlinear optimization, nonconvex optimization and its applications (pp. 35–59). Boston, MA: Springer. doi:10.1007/0-387-30065-1_4
  • Cao, Y., Jin, L., Nguyen, N. V. P., Landry, S., Sun, D., & Post, J. (2014). Evaluation of fuel benefits depending on continuous descent approach procedures. Air Traffic Control Q, 22(3), 251–275. doi:10.2514/atcq.22.3.251
  • Carraro, T., Geiger, M., & Rannacher, R. (2014). Indirect multiple shooting for nonlinear parabolic optimal control problems with control constraints. SIAM Journal on Scientific Computing, 36(2), A452–A481. doi:10.1137/120895809
  • Celis, C., Moss, B., & Pilidis, P. (2009a). Emissions modelling for the optimization of greener aircraft operations. 167–178. doi:10.1115/GT2009-59211
  • Celis, C., Moss, B., & Pilidis, P. (2009b). Emissions modelling for the optimization of greener aircraft operations, 167–178. doi:10.1115/GT2009-59211
  • Celis, C., Sethi, V., Zammit-Mangion, D., Singh, R., & Pilidis, P. P. (2014). Theoretical optimal trajectories for reducing the environmental impact of commercial aircraft operations. Journal of Aerospace Technology and Management, 6(1), 29–42. doi:10.5028/jatm.v6i1.288
  • Chaimatanan, S., Delahaye, D., & Mongeau, M. (2014). A hybrid metaheuristic optimization algorithm for strategic planning of 4D aircraft trajectories at the continental scale. IEEE Computational Intelligence Magazine, 9(4), 46–61. doi:10.1109/MCI.2014.2350951
  • Chakravarty, A. (1985). Four-dimensional fuel-optimal guidance in the presence of winds. The Journal of Guidance, Control, and Dynamics., 8(1), 16–22. doi:10.2514/3.19929
  • Chapman, L. (2007). Transport and climate change: A review. Journal of Transport Geography, 15(5), 354–367. doi:10.1016/j.jtrangeo.2006.11.008
  • Clarke, J.-P., Brooks, J., Nagle, G., Scacchioli, A., White, W., & Liu, S. R. (2013). Optimized profile descent arrivals at Los Angeles International Airport. Journal of Aircraft 50(2), 360–369. doi:10.2514/1.C031529
  • Dai, L. (1989). Singular control systems (Lecture notes in control and information sciences). Springer-Verlag, Berlin Heidelberg.
  • Delahaye, D., Puechmorel, S., Tsiotras, P., & Feron, E. (2014). Mathematical models for aircraft trajectory design: A survey. In Air traffic management and systems, lecture notes in electrical engineering (pp. 205–247). Tokyo: Springer. doi:10.1007/978-4-431-54475-3_12
  • Diehl, M., Bock, H. G., Diedam, H., Wieber, P.-B. (2006). Fast Direct Multiple Shooting Algorithms for Optimal Robot Control, in: Fast Motions in Biomechanics and Robotics, Lecture Notes in Control and Information Sciences. Springer, Berlin, Heidelberg, pp. 65–93. doi:10.1007/978-3-540-36119-0_4
  • Djojodihardjo, H. (2015). Green aircraft technology imperatives for environmental sustainability. Applied Mechanics and Materials, 815, 273–281. doi:10.4028/www.scientific.net/AMM.815.273
  • Dunlavy, D. M., & O’Leary, D. P. (2005). Homotopy optimization methods for global optimization. No. SAND2005-7495. Sandia National Laboratories.
  • Durand, N., & Alliot, J.-M. (2009). Ant c olony o ptimization for a ir t raffic c onflict r esolution. Presented at the ATM Seminar 2009, 8th USA/Europe Air Traffic Management Research and Development Seminar.
  • Elnagar, G., Kazemi, M. A., & Razzaghi, M. (1995). The pseudospectral Legendre method for discretizing optimal control problems. IEEE Transactions on Automatic Control, 40(10), 1793–1796. doi:10.1109/9.467672
  • Enright, P. J., & Conway, B. A. (1992). Discrete approximations to optimal trajectories using direct transcription and nonlinear programming. The Journal of Guidance, Control, and Dynamics, 15(4), 994–1002. doi:10.2514/3.20934
  • Erzberger, H., & Lee, H. (1980). Constrained optimum trajectories with specified range. The Journal of Guidance, Control, and Dynamics, 3(1), 78–85. doi:10.2514/3.55950
  • Federal Aviation Administration (2015). Zubrow, A., Noel, G., Baker, G., Grandi, F., Didyk, N., Majeed, M., 2015. Aviation Environmental Design Tool (AEDT 2b). United States.
  • Fernandes de Oliveira, R. (2013). On-board decoupled vertical and lateral flight planning for minimum emissions and population disturbance. SAE International Journal of Aerospace, 6(1), 223–236. doi:10.4271/2013-01-2299
  • Fernandes de Oliveira, R., & Büskens, C. (2011). On-board trajectory optimization of RNAV departure and arrival procedures concerning emissions and population annoyance. doi: 10.4271/2011-01-2595
  • Filippone, A. (2006). Flight performance of fixed and rotary wing aircraft. Washington, DC: American Institute of Aeronautics and Astronautics. doi:10.2514/4.478390
  • Fisch, F., Bittner, M., & Holzapfel, F. (2013). Optimal scheduling of fuel-minimal approach trajectories. Journal of Aerospace Operation, 2, 145–160. doi:10.3233/AOP-140039
  • Foroutan, M., Ebadian, A., & Najafzadeh, S. (2017). Analysis of unsteady stagnation-point flow over a shrinking sheet and solving the equation with rational Chebyshev functions. Mathematical Methods in the Applied Sciences, 40(7), 2610–2622. doi:10.1002/mma.4185
  • Franco, A., & Rivas, D. (2014). Analysis of optimal aircraft cruise with fixed arrival time including wind effects. Aerospace Science and. Technology, 32(1), 212–222. doi:10.1016/j.ast.2013.10.005
  • Franco, A., & Rivas, D. (2011). Minimum-cost cruise at constant altitude of commercial aircraft including wind effects. The Journal of Guidance, Control, and Dynamics., 34(4), 1253–1260. doi:10.2514/1.53255
  • Franco, A., Rivas, D., & Valenzuela, A. (2012). Optimization of unpowered descents of commercial aircraft in altitude-dependent winds. Journal of Aircraft, 49(5), 1460–1470. doi:10.2514/1.C031737
  • Franssen, E. A. M., Wiechen, C. M. A. G. V., Nagelkerke, N. J. D., & Lebret, E. (2004). Aircraft noise around a large international airport and its impact on general health and medication use. Occupational and Environmental Medicine, 61(5), 405–413. doi:10.1136/oem.2002.005488
  • Ganic, E. M., Netjasov, F., & Babic, O. (2015). Analysis of noise abatement measures on European airports. Applied Acoustics., 92, 115–123. doi:10.1016/j.apacoust.2015.01.010
  • García-Heras, J., Soler, M., & Sáez, F. J. (2016). Collocation methods to minimum-fuel trajectory problems with required time of arrival in ATM. Journal of Aerospace Information System, 13, 243–265. doi:10.2514/1.I010401
  • García-Heras, J., Soler, M., & Sáez, F. J. (2014). A comparison of optimal control methods for minimum fuel cruise at constant altitude and course with fixed arrival time. Procedia Eng., 3rd International Symposium on Aircraft Airworthiness (ISAA 2013), 80, 231–244. doi:10.1016/j.proeng.2014.09.083
  • Gardi, A., Sabatini, R., Marino, M., & Kistan, T. (2016a). Multi-objective 4D trajectory optimization for online strategic and tactical air traffic management. In: T. Hikmet Karakoc, M. Baris Ozerdem, M. Ziya Sogut, Can Ozgur Colpan, Onder Altuntas, Emin Açıkkalp (Eds.), Sustainable aviation (pp. 185–200). Cham: Springer. doi:10.1007/978-3-319-34181-1_17
  • Gardi, A., Sabatini, R., & Ramasamy, S. (2016). Multi-objective optimisation of aircraft flight trajectories in the ATM and avionics context. Progress in Aerospace Science, 83, 1–36. doi:10.1016/j.paerosci.2015.11.006
  • Gerdts, M. (2003). Direct shooting method for the numerical solution of higher-index DAE optimal control problems. Journal of Optimization Theory and Applications, 117(2), 267. doi:10.1023/A:1023679622905
  • Gill, P., Murray, W., & Saunders, M. (2005). SNOPT: An SQP algorithm for large-scale constrained optimization. SIAM Review, 47(1), 99–131. doi:10.1137/S0036144504446096
  • Girvin, R. (2009). Aircraft noise-abatement and mitigation strategies. Journal of Air Transport Management, 15(1), 14–22. doi:10.1016/j.jairtraman.2008.09.012
  • Giselsson, P., Doan, M. D., Keviczky, T., Schutter, B. D., & Rantzer, A. (2013). Accelerated gradient methods and dual decomposition in distributed model predictive control. Automatica, 49(3), 829–833. doi:10.1016/j.automatica.2013.01.009
  • González-Arribas, D., Soler, M., & Sanjurjo-Rivo, M. (2018). Robust aircraft trajectory planning under wind uncertainty using optimal control. The Journal of Guidance, Control, and Dynamics, 41(3), 673–688. doi:10.2514/1.G002928
  • Guo, B., & Yan, J. (2009). Legendre–Gauss collocation method for initial value problems of second order ordinary differential equations. Applied Numerical Mathematics, 59(6), 1386–1408. doi:10.1016/j.apnum.2008.08.007
  • Hamadiche, M., Haddou, M., Ndimubandi, J., Khardi, S., & Nahayo, F. (2016). Two-aircraft acoustic optimal control problem: SQP algorithms. Revue africaine Recherche en informatique et Mathématiques Appliquées, 14–2011, Special issue CARI’10.
  • Hanert, E., & Piret, C. (2014). A Chebyshev PseudoSpectral method to solve the space-time tempered fractional diffusion equation. SIAM Journal on Scientific Computing, 36(4), A1797–A1812. doi:10.1137/130927292
  • Hargraves, C. R., & Paris, S. W. (1987). Direct trajectory optimization using nonlinear programming and collocation. The Journal of Guidance, Control, and Dynamics, 10(4), 338–342. doi:10.2514/3.20223
  • Hartjes, S., Dons, J., & Visser, H. G. (2014). Optimization of area navigation arrival routes for cumulative noise exposure. Journal of Aircraft, 51(5), 1432–1438. doi:10.2514/1.C032302
  • Hartjes, S., Hendriks, T., & Visser, D. (2016). Contrail mitigation through 3D aircraft trajectory optimization. In: 16th AIAA Aviation Technology, Integration, and Operations Conference. American Institute of Aeronautics and Astronautics, p. 3908. doi:10.2514/6.2016-3908
  • Hartjes, S., & Visser, H. G. (2016). Efficient trajectory parameterization for environmental optimization of departure flight paths using a genetic algorithm. Journal of Aerospace Engineering. doi:10.1177/0954410016648980
  • Hartjes, S., Visser, H. G., & Hebly, S. J. (2010). Optimisation of RNAV noise and emission abatement standard instrument departures. The Aeronautical Journal, 114(1162), 757–767. doi:10.1017/S0001924000004243
  • Hartjes, S., Visser, H. G., & Hebly, S. J. (2009). Optimization of RNAV noise and emission abatement departure procedures. In 9th AIAA Aviation Technology, Integration, and Operations Conference (ATIO) and Aircraft Noise and Emissions Reduction Symposium (ANERS), p. 6953.
  • Hasegawa, T., Tsuchiya, T., & Mori, R. (2015). Optimization of a pproach t rajectory c onsidering the c onstraints i mposed on f light p rocedure d esign. Procedia Eng., 2014 Asia-Pacific International Symposium on Aerospace Technology, APISAT2014 September 24–26, 2014 Shanghai, China 99, 259–267. doi:10.1016/j.proeng.2014.12.534
  • Hebly, S. J., & Visser, H. G. (2015). Advanced noise abatement departure procedures: custom-optimised departure profiles. The Aeronautical Journal, 119(1215), 647–661. doi:10.1017/S0001924000010733
  • Hentzen, D., Kamgarpour, M., Soler, M., & González-Arribas, D. (2018). On maximizing safety in stochastic aircraft trajectory planning with uncertain thunderstorm development. Aerospace Science Technology, 79, 543–553. doi:10.1016/j.ast.2018.06.006
  • Hereid, A., Cousineau, E. A., Hubicki, C. M., & Ames, A. D. (2016). 3D dynamic walking with underactuated humanoid robots: A direct collocation framework for optimizing hybrid zero dynamics . 2016 IEEE International Conference on Robotics and Automation (ICRA). Presented at the 2016 IEEE International Conference on Robotics and Automation (ICRA), pp. 1447–1454. doi:10.1109/ICRA.2016.7487279
  • Herman, A. L., & Conway, B. A. (1996). Direct optimization using collocation based on high-order Gauss-Lobatto quadrature rules. The Journal of Guidance, Control, and Dynamics., 19(3), 592–599. doi:10.2514/3.21662
  • Hogenhuis, R. H., Hebly, S. J., & Visser, H. G. (2011). Optimization of area navigation noise abatement approach trajectories. Proceedings of the Institution of Mechanical Engineers Part G: Journal of Aerospace Engineering, 225(5), 513–521. doi:10.1177/09544100JAERO840
  • Horowitz, M. B., Damle, A., & Burdick, J. W. (2014). Linear hamilton Jacobi Bellman Equations in high dimensions. In: 53rd IEEE Conference on Decision and Control. Presented at the 53rd IEEE Conference on Decision and Control, pp. 5880–5887. doi:10.1109/CDC.2014.7040310
  • Hu, J., Prandini, M., & Sastry, S. (2002). Optimal coordinated maneuvers for three-dimensional aircraft conflict resolution. The Journal of Guidance, Control, and Dynamics., 25(5), 888–900. doi:10.2514/2.4982
  • Hull, D. G. (2013). Optimal control theory for applications. Springer Science & Business Media. Springer Science.
  • IATA (2009). International air transportation association financial forecast. Montreal: Author.
  • ICAO (2010). ICAO environmental report – operational opportunities. Montreal: Author.
  • Isaacson, D., Davis, T., John Robinson, I., Isaacson, D., Davis, T., & John Robinson, I. (1997). Knowledge-based runway assignment for arrival aircraft in the terminal area. In: Guidance, Navigation, and Control Conference. American Institute of Aeronautics and Astronautics. doi:10.2514/6.1997-3543
  • Jackson, M. R., Zhao, Y. J., & Slattery, R. A. (1999). Sensitivity of trajectory prediction in air traffic management. The Journal of Guidance, Control, and Dynamics., 22(2), 219–228. doi:10.2514/2.4398
  • Janssen, S. A., Centen, M. R., Vos, H., & van Kamp, I. (2014). The effect of the number of aircraft noise events on sleep quality. Applied Acoustics Special Issue: Air Transport Noise, 84, 9–16. doi:10.1016/j.apacoust.2014.04.002
  • Jost, J., & Li-Jost, X. (1998). Calculus of variations. Cambridge University Press. USA.
  • Khardi, S. (2013). Applied methods validating aircraft flight path optimization. Theoretical and experimental considerations. Applied Mathematical Sciences, 7, 2209–2228. doi:10.12988/ams.2013.13198
  • Khardi, S. (2012). Aircraft flight path optimization. The Hamilton-Jacobi-Bellman considerations. Applied Mathematical Science, 6, 1221–1249.
  • Khardi, S. (2011). Development of innovative optimized flight paths of aircraft takeoffs reducing noise and fuel consumption. Acta Acustica United with Acustica, 97(1), 148–154. doi:10.3813/AAA.918395
  • Khardi, S. (2010). Mathematical model for advanced CDA and takeoff procedures minimizing aircraft environmental impact. International Mathematical Forum, 5, 1747–1774.
  • Khardi, S., & Abdallah, L. (2012). Optimization approaches of aircraft flight path reducing noise: Comparison of modeling methods. Applied Acoustics., 73(4), 291–301. doi:10.1016/j.apacoust.2011.06.012
  • Khardi, S., Abdallah, L., Houacine, M., & Konovalova, O. (2010). Optimal approach minimizing aircraft noise and fuel consumption. Acta Acustica United with Acustica, 96(1), 68–75. doi:10.3813/AAA.918257
  • Khoo, H. L., & Teoh, L. E. (2014). A bi-objective dynamic programming approach for airline green fleet planning. Transportation Research Part Transport and Environment, 33, 166–185. doi:10.1016/j.trd.2014.06.003
  • Kirk, D. E. (2012). Optimal control theory: An introduction. Chelmsford: Courier Corporation.
  • Lee, D. S., Fahey, D. W., Forster, P. M., Newton, P. J., Wit, R. C. N., Lim, L. L., … Sausen, R. (2009). Aviation and global climate change in the 21st century. Atmospheric Environment, 43(22–23), 3520–3537. doi:10.1016/j.atmosenv.2009.04.024
  • Liberzon, D. (2012). Calculus of variations and optimal control theory: A concise introduction. Princeton, NJ: Princeton University Press.
  • Lim, C., Kim, J., Hong, J., & Lee, S. (2008). Effect of background noise levels on community annoyance from aircraft noise. The Journal of the Acoustical Society of America, 123(2), 766–771. doi:10.1121/1.2821985
  • Lim, Y., Gardi, A., & Sabatini, R. (2017). Optimal aircraft trajectories to minimize the radiative impact of contrails and CO2 . Energy Procedia, 1st International Conference on Energy and Power, ICEP2016, 14-16 December 2016, RMIT University, Melbourne, Australia 110, 446–452. doi:10.1016/j.egypro.2017.03.167
  • Masiol, M., & Harrison, R. M. (2014). Aircraft engine exhaust emissions and other airport-related contributions to ambient air pollution: A review. Atmospheric Environment, 95, 409–455. doi:10.1016/j.atmosenv.2014.05.070
  • Masson, B., Bain, M., & Page, J. (2011). Engine-out takeoff path optimization out of terrain challenging airports. AIAA Guidance, Navigation, and Control Conference. American Institute of Aeronautics and Astronautics. doi:10.2514/6.2011-6313
  • McEnteggart, Q., & Whidborne, J. (2012). A multiobjective trajectory optimisation method for planning environmentally efficient trajectories. In: Proceedings of 2012 UKACC International Conference on Control. Presented at the Proceedings of 2012 UKACC International Conference on Control, pp. 128–135. doi:10.1109/CONTROL.2012.6334618
  • Miyazawa, Y., Wickramasinghe, N. K., Harada, A., & Miyamoto, Y. (2013). Dynamic programming application to airliner four dimensional optimal flight trajectory. In: AIAA Guidance, Navigation, and Control (GNC) Conference. American Institute of Aeronautics and Astronautics. doi:10.2514/6.2013-4969
  • Morrell, P., & Lu, C. H.-Y. (2000). Aircraft noise social cost and charge mechanisms – a case study of Amsterdam Airport Schiphol. Transportation Research Part Transport and Environment, 5(4), 305–320. doi:10.1016/S1361-9209(99)00035-8
  • Neuman, F., & Kreindler, E. (1985). Minimum-fuel, three-dimensional flight paths for jet transports. The Journal of Guidance, Control, and Dynamics, 8(5), 650–657. doi:10.2514/3.20035
  • Oliveira, R. F. D., & Büskens, D. C. (2012). Benefits of optimal flight planning on noise and emissions abatement at the Frankfurt airport. AIAA Guidance, Navigation, and Control Conference. American Institute of Aeronautics and Astronautics. doi:10.2514/6.2012-4482
  • Ozkurt, N., Sari, D., Akdag, A., Kutukoglu, M., & Gurarslan, A. (2014). Modeling of noise pollution and estimated human exposure around İstanbul Atatürk Airport in Turkey. Science of the Total Environment, 482, 486–492. doi:10.1016/j.scitotenv.2013.08.017
  • Pargett, D. M., & Ardema, M. D. (2007). Flight path optimization at constant altitude. The Journal of Guidance, Control, and Dynamics, 30(4), 1197–1201. doi:10.2514/1.28954
  • Park, S. G., & Clarke, J.-P. (2016). Vertical trajectory optimization to minimize environmental impact in the presence of wind. Journal of Aircraft, 53(3), 725–737. doi:10.2514/1.C032974
  • Parter, S. V. (1999). On the Legendre–Gauss–Lobatto points and weights. Journal of Scientific Computing, 14(4), 347–355. [Mismatch] doi:10.1023/A:1023204631825
  • Patel, R. B., & Goulart, P. J. (2011). Trajectory generation for aircraft avoidance maneuvers using online optimization. The Journal of Guidance, Control, and Dynamics, 34(1), 218–230. doi:10.2514/1.49518
  • Patron, R. F., Kessaci, A., & Botez, R. M. (2013). Flight trajectories optimization under the influence of winds using genetic algorithms. AIAA Guidance, Navigation, and Control (GNC) Conference. p. 4620.
  • Patrón, R. S. F., & Botez, R. M. (2015). Flight trajectory optimization through genetic algorithms for lateral and vertical integrated navigation. Journal of Aerospace Information System, 12, 533–544. doi:10.2514/1.I010348
  • Paulen, R., & Fikar, M. (2016). Solution of optimal control problems. In R. Paulen, M. Fikar (Eds.), Optimal operation of batch membrane processes, advances in industrial control (pp. 37–56). Cham: Springer International Publishing. doi:10.1007/978-3-319-20475-8_3
  • Pervier, H., Nalianda, D., Espi, R., Sethi, V., Pilidis, P., Zammit-Mangion, D., … Entz, R. (2011). Application of genetic algorithm for preliminary trajectory optimization. SAE International Journal of Aerospace, 4(2), 973–987. doi:10.4271/2011-01-2594
  • Prats Menéndez, X., Nejjari, A.-E. F., Puig Cayuela, V., Quevedo Casín, J. J., & Mora Camino, F. (2006). A framework for RNAV trajectory generation minimizing noise nuisances. A: Proceedings of Second International Conference on Research in Air Transportation. Belgrad: Faculty of Transport and Traffic Engineering, 19–28.
  • Prats, X., Puig, V., & Quevedo, J. (2011). Equitable aircraft noise-abatement departure procedures. The Journal of Guidance, Control, and Dynamics, 34(1), 192–203. doi:10.2514/1.49530
  • Prats, X., Puig, V., & Quevedo, J. (2011). A multi-objective optimization strategy for designing aircraft noise abatement procedures. Case study at Girona airport. Transportation Research Part Transport and Environment, 16(1), 31–41. doi:10.1016/j.trd.2010.07.007
  • Prats, X., Puig, V., Quevedo, J., & Nejjari, F. (2010). Multi-objective optimisation for aircraft departure trajectories minimising noise annoyance. Transportation Research Part C Emerging Technologies, Special Issue on Transportation Simulation Advances in Air Transportation Research, 18, 975–989. doi:10.1016/j.trc.2010.03.001
  • Ralph, M. O., & Newton, P. J. (1996). Experts consider operational measures as means to reduce emissions and their environmental impacts. (ICAO Journal). International Civil Aviation Organisation, Department of Trade and Industry: Montreal.
  • Ramasamy, S., Gardi, A., & Sabatini, R. (2014). Aircraft noise modelling and trajectory optimisation for reduced environmental impacts at major Australian airports. Presented at the PRCC 2014, Engineers Australia, pp. 1–12.
  • Rao, A. V. (2014). Trajectory optimization: A survey. In: Optimization and optimal control in automotive systems, lecture notes in control and information sciences (pp. 3–21). Cham: Springer. doi:10.1007/978-3-319-05371-4_1
  • Rao, A. V. (2010). Trajectory optimization. In Encyclopedia of aerospace engineering. John Wiley & Sons, Ltd., USA. doi:10.1002/9780470686652.eae502
  • Rao, A. V. (2009). A survey of numerical methods for optimal control. Advances in Astronautical Science, 135, 497–528.
  • Rey, D., & Hijazi, H. (2017). Complex number formulation and convex relaxations for aircraft conflict resolution. 2017 IEEE 56th Annual Conference on Decision and Control (CDC). Presented at the 2017 IEEE 56th Annual Conference on Decision and Control (CDC), pp. 88–93. doi:10.1109/CDC.2017.8263648
  • Rey, D., Rapine, C., Dixit, V. V., & Waller, S. T. (2015). Equity-oriented aircraft collision avoidance model. IEEE Transactions on Intelligent Transportation Systems, 16(1), 172–183. doi:10.1109/TITS.2014.2329012
  • Rey, D., Rapine, C., Fondacci, R., & El Faouzi, N. (2016). Subliminal speed control in air traffic management: optimization and simulation. Transportation Science, 50(1), 240–262. doi:10.1287/trsc.2015.0602
  • Richter, M., Bittner, M., Rieck, M., & Holzapfel, F. (2014). A non-cooperative bi-level optimal control problem formulation for noise minimal departure trajectories. Proceedings of the 29th International Congress of the Aeronautical Sciences (ICAS). Presented at the International Congress of the Aeronautical Sciences (ICAS). St. Petersburg, Russia.
  • Rivas, D., & Valenzuela, A. (2009). Compressibility effects on maximum range cruise at constant altitude. The Journal of Guidance, Control, and Dynamics, 32(5), 1654–1658. doi:10.2514/1.44039
  • Roskam, J. (1995). Airplane flight dynamics and automatic flight controls. DARcorporation. [Database]
  • Rutowski, E. S. (1954). Energy approach to the general aircraft performance problem. Journal of Aeronautical Science, 21, 187–195. doi:10.2514/8.2956
  • Rylander, R., & Björkman, M. (1997). Annoyance by aircraft noise around small airports. Journal of Sound Vibrations., 205(4), 533–537. doi:10.1006/jsvi.1997.1022
  • Salah, K. (2014). Environmental impact reduction of commercial aircraft around airports. Less noise and less fuel consumption. European Transport Research Review, 6(1), 71–84. doi:10.1007/s12544-013-0106-0
  • Schaback, R. (2017). The mathematics of fuel-to-distance-optimal flight. ArXiv170500646 Math.
  • Schaufele, R. D. (2000). The elements of aircraft preliminary design. Aries Publications. Australia.
  • Schneider, O., Kreth, S., & Bertsch, L. (2010). Towards a quiet short take-off and landing transportation system. Concept Evaluation and ATM Integration.
  • Sloan, I. H. (1988). A quadrature-based approach to improving the collocation method. Numerische Mathematik, 54(1), 41–56. doi:10.1007/BF01403890
  • Soler, M., Kamgarpour, M., Lloret, J., & Lygeros, J. (2016). A hybrid optimal control approach to fuel-efficient aircraft conflict avoidance. IEEE Transactions on Intelligent Transportation Systems, 17(7), 1826–1838. doi:10.1109/TITS.2015.2510824
  • Soler, M., Kamgarpour, M., Tomlin, C., & Staffetti, E. (2012a). Multiphase mixed-integer optimal control framework for aircraft conflict avoidance. In: 2012 IEEE 51st IEEE Conference on Decision and Control (CDC). Presented at the 2012 IEEE 51st IEEE Conference on Decision and Control (CDC), pp. 1740–1745. doi:10.1109/CDC.2012.6426709
  • Soler, M., Olivares, A., & Staffetti, E. (2010). Hybrid optimal control approach to commercial aircraft trajectory planning. The Journal of Guidance, Control, and Dynamics, 33(3), 985–991. doi:10.2514/1.47458
  • Soler, M., Olivares, A., Staffetti, E., & Cegarra, J. (2011). Multi-phase optimal control applied to 4D business trajectory strategic planning in air traffic management. In: Proceedings of the 1st International Conference on Application and Theory of Automation in Command and Control Systems, ATACCS ’11 (pp. 68–78). Toulouse, France: IRIT Press.
  • Soler, M., Olivares, A., Staffetti, E., & Zapata, D. (2012). Framework for aircraft trajectory planning toward an efficient air traffic management. Journal of Aircraft, 49(1), 341–348. doi:10.2514/1.C031490
  • Sorensen, J. A., & Waters, M. H. (1981). Airborne method to minimize fuel with fixed time-of-arrival constraints. Journal of Guidance Control and Dynamic, 4, 348–349. doi:10.2514/3.56086
  • Standards Australia (2015). Acoustics – Aircraft noise intrusion – Building siting and construction AS2021.
  • Stevens, B. L., Lewis, F. L., & Johnson, E. N. (2015). Aircraft control and simulation: Dynamics, controls design, and autonomous systems. John Wiley & Sons. USA.
  • Stryk, O. V. (1993). Numerical solution of optimal control problems by direct collocation. In: Optimal control, ISNM International Series of Numerical Mathematics (pp. 129–143). Basel: Birkhäuser. doi:10.1007/978-3-0348-7539-4_10
  • Stryk, O. V., & Bulirsch, R. (1992a). Direct and indirect methods for trajectory optimization. Annals of Operations Research, 37, 357–373. doi:10.1007/BF02071065
  • Stryk, O. von, Bulirsch, R. (1992). Direct and indirect methods for trajectory optimization. Ann. Oper. Res. 37, 357–373. doi:10.1007/BF02071065
  • Subchan, D. S., & Zbikowski, R. (2009). Computational optimal control: Tools and practice. John Wiley & Sons. USA.
  • Tang, X.-J., Wei, J.-L., & Chen, K. (2015). A Chebyshev-Gauss pseudospectral method for solving optimal control problems. Acta Automatica Sinica., 41, 1778–1787. doi:10.1016/S1874-1029(15)30004-5
  • Teoh, L. E., & Khoo, H. L. (2016). Green air transport system: An overview of issues, strategies and challenges. KSCE Journal of Civil Engineering, 20(3), 1040–1052. doi:10.1007/s12205-016-1670-3
  • Thomas, J., Jensen, L., Brooks, C., Brenner, M., Salgueiro, S., & Hansman, R. J. (2017). Investigation of Aircraft Approach and Departure Velocity Profiles on Community Noise. In: 23rd AIAA/CEAS Aeroacoustics Conference. American Institute of Aeronautics and Astronautics. doi:10.2514/6.2017-3188
  • Torres, R., Chaptal, J., Bès, C., & Hiriart-Urruty, J.-B. (2011). Optimal, environmentally friendly departure procedures for civil aircraft. Journal of Aircraft, 48(1), 11–22. doi:10.2514/1.C031012
  • Torres, S. (2012). Swarm theory applied to air traffic flow management. Procedia Computer Science, Complex Adaptive Systems, 12, 463–470. doi:10.1016/j.procs.2012.09.105
  • Tranfield, D., Denyer, D., & Smart, P. (2003). Towards a methodology for developing evidence-informed management knowledge by means of systematic review. British Journal of Management, 14(3), 207–222. doi:10.1111/1467-8551.00375
  • Tsai, W.-H., Lee, K.-C., Liu, J.-Y., Lin, H.-L., Chou, Y.-W., & Lin, S.-J. (2012). A mixed activity-based costing decision model for green airline fleet planning under the constraints of the European Union Emissions Trading Scheme. Energy, Sustainable Energy and Environmental Protection, 39, 218–226. doi:10.1016/j.energy.2012.01.027
  • Tsiotras, P., Bakolas, E., & Zhao, Y. (2011). Initial guess generation for aircraft landing trajectory optimization. In: AIAA Guidance, Navigation, and Control Conference. American Institute of Aeronautics and Astronautics. doi:10.2514/6.2011-6689.
  • Vera, S., Cobano, J. A., Alejo, D., Heredia, G., & Ollero, A. (2015). Optimal conflict resolution for multiple UAVs using pseudospectral collocation. In: 2015 23rd Mediterranean Conference on Control and Automation (MED). Presented at the 2015 23rd Mediterranean Conference on Control and Automation (MED), pp. 28–35. doi:10.1109/MED.2015.7158725
  • Villarroel, J., & Rodrigues, L. (2016). Optimal control framework for cruise economy mode of flight management systems. The Journal of Guidance, Control, and Dynamics, 39(5), 1022–1033. doi:10.2514/1.G001373
  • Visser, H., & Wijnen, R. (2001a). Optimization of noise abatement departure trajectories. In: Atmospheric Flight Mechanics Conference. American Institute of Aeronautics and Astronautics. doi:10.2514/6.2000-3991
  • Visser, H. G. (2010). Airplane performance optimization. In: Encyclopedia of aerospace engineering. John Wiley & Sons, Ltd. doi:10.1002/9780470686652.eae393
  • Visser, H. G. (2008). Environmentally optimized resolutions of in-trail separation conflicts for arrival flights. Journal of Aircraft, 45(4), 1198–1205. doi:10.2514/1.34090
  • Visser, H. G. (2005). Generic and site-specific criteria in the optimization of noise abatement trajectories. Transportation Research Part D: Transport and Environment, 10(5), 405–419. doi:10.1016/j.trd.2005.05.001
  • Visser, H. G., & Hartjes, S. (2014). Economic and environmental optimization of flight trajectories connecting a city-pair. Proceeding of the Institution of Mechanical Engineers Part G: Journal of Aerospace Engineering, 228(6), 980–993. doi:10.1177/0954410013485348
  • Visser, H. G., & Wijnen, R., A. A. (2003). Optimisation of noise abatement arrival trajectories. The Aeronautical Journal, 107, 607–615. doi:10.1017/S0001924000013828
  • Visser, H. G., & Wijnen, R. A. A. (2001b). Optimization of noise abatement arrival trajectories. In: AIAA Guidance, Navigation, and Control Conference and Exhibit.
  • Vormer, F., Mulder, M., Paassen, R. V., & Mulder, J. A. (2006). Optimization of flexible approach trajectories using a genetic algorithm. Journal of Aircraft, 43(4), 941–952. doi:10.2514/1.13609
  • Wächter, A., Biegler, L. T., 2005. On the implementation of an interior-point filter line-search algorithm for large-scale nonlinear programming. Math. Program. 106, 25–57. doi:10.1007/s10107-004-0559-y
  • Wächter, A., & Biegler, L. T. (2006). On the implementation of an interior-point filter line-search algorithm for large-scale nonlinear programming. Mathematical Programming, 106(1), 25–57. doi:10.1007/s10107-004-0559-y
  • Wang, Z., & Guo, B. (2012). Legendre-Gauss-Radau collocation method for solving initial value problems of first order ordinary differential equations. Journal of Scientific Computing, 52(1), 226–255. doi:10.1007/s10915-011-9538-7
  • Wang, Z.-Q., & Mu, J. (2016). A multiple interval Chebyshev-Gauss-Lobatto collocation method for ordinary differential equations. Numerical Mathematics: Theory, Methods and Applications, 9(04), 619–639. doi:10.4208/nmtma.2016.m1429
  • White, K., Arntzen, M., Walker, F., Waiyaki, F. M., Meeter, M., & Bronkhorst, A. W. (2017). Noise annoyance caused by continuous descent approaches compared to regular descent procedures. Applied Acoustics, 125, 194–198. doi:10.1016/j.apacoust.2017.04.008
  • Wijnen, R. A. A., & Visser, H. G. (2003). Optimal departure trajectories with respect to sleep disturbance. Aerospace Science and Technology, 7(1), 81–91. doi:10.1016/S1270-9638(02)01183-5
  • Williams, P. (2009). Hermite-Legendre-Gauss-Lobatto direct transcription in trajectory optimization. The Journal of Guidance, Control, and Dynamics, 32(4), 1392–1395. doi:10.2514/1.42731
  • Wu, D., & Zhao, Y. (2011). Optimization and sensitivity analysis of climb and descent trajectories for reducing fuel burn and emissions. In: 11th AIAA Aviation Technology, Integration, and Operations (ATIO) Conference. American Institute of Aeronautics and Astronautics. doi:10.2514/6.2011-6879
  • Yu, H., Kampen, E.-J. V., & Mulder, J. A. (2016). An optimization paradigm for arrival trajectories using trajectory segmentation and state parameterization. In: AIAA Guidance, Navigation, and Control Conference. American Institute of Aeronautics and Astronautics. doi:10.2514/6.2016-1872
  • Yu, H., & Mulder, J. (2012). Noise abatement trajectory optimization using genetic algorithms. In: AIAA Guidance, Navigation, and Control Conference. American Institute of Aeronautics and Astronautics. doi:10.2514/6.2012-4711
  • Zachary, D. S., Gervais, J., & Leopold, U. (2010). Multi-impact optimization to reduce aviation noise and emissions. Transportation Research Part D: Transport and Environment, 15(2), 82–93. doi:10.1016/j.trd.2009.09.005
  • Zhang, M., Filippone, A., & Bojdo, N. (2017). Using trajectory optimization to minimize aircraft noise impact [WWW Document]. URL https://www.ingentaconnect.com/contentone/ince/incecp/2017/00000255/00000003/art00002 (accessed 10.13.18).
  • Zhang, M., Filippone, A., & Bojdo, N. (2016). Multi-objective departure trajectory optimisation of commercial aircraft on environmental impacts. In Proceedings of the Greener Aviation Conference, Brussels, Belgium, 11–13.
  • Zhou, J., Cafieri, S., Delahaye, D., & Sbihi, M. (2014). Optimization of arrival and departure routes in terminal maneuvering area. ICRAT 2014, 6th International Conference on Research in Air Transportation. Istanbul Technical University, Istanbul, Turkey.

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