Constraint Handling and Multi-Objective Methods for the Evolution of Interplanetary Trajectories
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[1] Bernardetta Addis,et al. A global optimization method for the design of space trajectories , 2011, Comput. Optim. Appl..
[2] James M. Longuski,et al. Multiple-satellite-aided capture trajectories at Jupiter using the Laplace resonance , 2011 .
[3] Bruce A. Conway,et al. Spacecraft Trajectory Optimization: Contents , 2010 .
[4] Dario Izzo,et al. Spacecraft Trajectory Optimization: Global Optimization and Space Pruning for Spacecraft Trajectory Design , 2010 .
[5] Lorenzo Casalino,et al. Cooperative evolutionary algorithm for space trajectory optimization , 2009 .
[6] Qingfu Zhang,et al. Multiobjective Optimization Problems With Complicated Pareto Sets, MOEA/D and NSGA-II , 2009, IEEE Transactions on Evolutionary Computation.
[7] Massimiliano Vasile,et al. On testing global optimization algorithms for space trajectory design , 2008 .
[8] Janez Brest,et al. Self-Adapting Control Parameters in Differential Evolution: A Comparative Study on Numerical Benchmark Problems , 2006, IEEE Transactions on Evolutionary Computation.
[9] Anne Auger,et al. Performance evaluation of an advanced local search evolutionary algorithm , 2005, 2005 IEEE Congress on Evolutionary Computation.
[10] David E. Goldberg,et al. Genetic algorithms and Machine Learning , 1988, Machine Learning.
[11] Seungwon Lee,et al. Evolutionary Computing for Low-Thrust Navigation , 2005 .
[12] Nikolaus Hansen,et al. Evaluating the CMA Evolution Strategy on Multimodal Test Functions , 2004, PPSN.
[13] Kalyanmoy Deb,et al. A fast and elitist multiobjective genetic algorithm: NSGA-II , 2002, IEEE Trans. Evol. Comput..
[14] Michael A. Saunders,et al. SNOPT: An SQP Algorithm for Large-Scale Constrained Optimization , 2002, SIAM J. Optim..
[15] Carlos A. Coello Coello,et al. THEORETICAL AND NUMERICAL CONSTRAINT-HANDLING TECHNIQUES USED WITH EVOLUTIONARY ALGORITHMS: A SURVEY OF THE STATE OF THE ART , 2002 .
[16] Robert H. Leary,et al. Global Optimization on Funneling Landscapes , 2000, J. Glob. Optim..
[17] Carlos A. Coello Coello,et al. Use of a self-adaptive penalty approach for engineering optimization problems , 2000 .
[18] Zbigniew Michalewicz,et al. Parameter Control in Evolutionary Algorithms , 2007, Parameter Setting in Evolutionary Algorithms.
[19] Richard H. Battin,et al. Solving Lambert's Problem , 1999 .
[20] J. Betts. Survey of Numerical Methods for Trajectory Optimization , 1998 .
[21] Rainer Storn,et al. Differential Evolution – A Simple and Efficient Heuristic for global Optimization over Continuous Spaces , 1997, J. Glob. Optim..
[22] Victoria Coverstone-Carroll,et al. Near-Optimal Low-Thrust Trajectories via Micro-Genetic Algorithms , 1997 .
[23] Jongsoo Lee,et al. Constrained genetic search via schema adaptation: An immune network solution , 1996 .
[24] G. Rauwolf,et al. Near-optimal low-thrust orbit transfers generated by a genetic algorithm , 1996 .
[25] Sandro Ridella,et al. Minimizing multimodal functions of continuous variables with the “simulated annealing” algorithmCorrigenda for this article is available here , 1987, TOMS.