DocumentCode :
839592
Title :
The dynamic linear exponential Gaussian team problem
Author :
Krainak, Joseph C. ; Machell, Fredrick W. ; Marcus, Steven I. ; Speyer, Jason L.
Author_Institution :
Sandia Laboratories, Albequerque, NM, USA
Volume :
27
Issue :
4
fYear :
1982
fDate :
8/1/1982 12:00:00 AM
Firstpage :
860
Lastpage :
869
Abstract :
The dynamic team problem for a linear system with Gaussian noise, exponential of a quadratic performance index, and one-step delayed sharing information pattern is considered. It is shown, via dynamic programming, that the multistage problem can be decomposed into a series of static team problems. Moreover, the optimal policy of the 
th team member at time 
is an affine function of both the one-step predicted Kalman filter estimate and the th team member\´s observation at time . Efficient algorithms are available for determining the gains of this affine controller. This model and solution are applied to an approximate resource allocation problem associated with a defense network, and a numerical example is discussed.
th team member at time is an affine function of both the one-step predicted Kalman filter estimate and the th team member\´s observation at time . Efficient algorithms are available for determining the gains of this affine controller. This model and solution are applied to an approximate resource allocation problem associated with a defense network, and a numerical example is discussed.Keywords :
Distributed decision-making; Stochastic optimal control, linear systems; Aerodynamics; Control systems; Costs; Dynamic programming; History; Laboratories; Optimal control; Performance analysis; Resource management; Stochastic systems;
fLanguage :
English
Journal_Title :
Automatic Control, IEEE Transactions on
Publisher :
ieee
ISSN :
0018-9286
Type :
jour
DOI :
10.1109/TAC.1982.1103024
Filename :
1103024
Link To Document :
