DocumentCode
1345167
Title
Stochastic Approach to Optimal Guidance with Uncertain Intercept Time
Author
Hexner, Gyorgy ; Weiss, Haim
Author_Institution
Rafael, Adv. Defense Syst., Haifa, Israel
Volume
46
Issue
4
fYear
2010
Firstpage
1804
Lastpage
1820
Abstract
The paper presents a stochastic approach to optimal guidance with significant uncertainty in time until intercept. The uncertain intercept time is modeled as a random variable with discrete probability density. An optimal guidance law (OGL) is derived by solving the appropriate Hamilton-Jacobi recursion under the following assumptions: 1) the target maneuver is modeled as a first-order Gauss-Markov process; 2) the missile´s guidance commands are based on observing the line-of-sight (LOS) angle to the target in additive observation noise; 3) the missile acceleration response to the acceleration commands is well described by a linear first-order transfer function. Although the present problem is formulated in the linear quadratic Gaussian (LQG) framework, the certainty equivalence principle does not apply since the OGL depends on the discrete probability density of the time until intercept. A simple simulation example shows that when the interceptor has a large acceleration advantage over the target, the miss distances resulting from the use of the proposed law are essentially equivalent to those obtained when using the OGL, which requires full knowledge of the intercept time.
Keywords
linear quadratic Gaussian control; missile guidance; probability; stochastic processes; transfer functions; Hamilton-Jacobi recursion; additive observation noise; certainty equivalence principle; discrete probability density; first order Gauss-Markov process; line-of-sight angle; linear first order transfer function; linear quadratic Gaussian framework; missile acceleration response; missile guidance command; optimal guidance; optimal guidance law; random variable; stochastic approach; target maneuver; uncertain intercept time; Acceleration; Missiles; Observability; Sensitivity; Stochastic processes; Uncertainty;
fLanguage
English
Journal_Title
Aerospace and Electronic Systems, IEEE Transactions on
Publisher
ieee
ISSN
0018-9251
Type
jour
DOI
10.1109/TAES.2010.5595596
Filename
5595596
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