1 |
Guelman, M., Shinar, J., and Green, A. (1988). Qualitative study of a planar pursuit-evasion game in atmosphere. Proceedings of the AIAA Guidance, Navigation, and Control Conference, Minneapolis, MI. AIAA Paper 88-4158.
|
2 |
Hargraves, C. R. and Paris, S. W. (1987). Direct trajectory optimization using nonlinear programming and collocation. Journal of Guidance, Control, and Dynamics, l0, 338-342.
DOI
ScienceOn
|
3 |
Isaacs, R. (1967). Differential Games: A Mathematical Theory with Applications to Warfare and Pursuit, Control and Optimization. 2 printing ed. New York, NY: Wiley.
|
4 |
Kim, Y. S., Tahk, M. J., and Ryu, H. (2006). A guidance law based on pursuit-evasion game solutions. KSAS-JSASS Joint International Symposium on Aerospace Engineering, Busan, Korea.
|
5 |
Tahk, M. J., Ryu, H., and Kim, J. G. (1998a). An iterative numerical method for class of quantitative pursuit-evasion games. Proceeding of AIAA Guidance, Navigation, and Control Conference, Boston, MA. pp. 175-182.
|
6 |
Tahk, M. J., Ryu, H., Kim, J. G., and Rhee, I. S. (1998b). A gradient-based direct method for complex pursuit-evasion games. Proceedings of the 8th International Symposium on Dynamic Games, Vaals, Netherlands. pp. 579-582.
|
7 |
Breitner, M. H., Pesch, H. J., and Grimm, W. (1993). Complex differential games of pursuit-evasion type with state constraints, part 1: Necessary conditions for optimal open-loop strategies. Journal of Optimization Theory and Applications, 78, 419-441.
DOI
|