Lie algebraic methods in optimal control of stochastic systems with exponential-of-integral cost
Date
1999Source
Systems and Control LettersVolume
37Issue
2Pages
93-105Google Scholar check
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The purpose of this paper is to formulate and study the optimal control of partially observed stochastic systems with exponential-of-integral-sample cost, known as risk-sensitive problems, using Lie algebraic tools. This leads to the introduction of the sufficient statistic algebra, ℒs, through which one can determine a priori the maximum order of the controller. When dim(ℒs) < ∞, the construction of the control laws is addressed through extensions of the Wei-Norman method, as in nonlinear filtering problems. Aside from specific known finite-dimensional examples which are studied in order to delineate the application of the Lie algebraic tools, new classes of finite-dimensional controllers are identified as well. In addition, relations with minimax dynamic games are explored to best assess the importance and generality of the finite-dimensional control systems. © 1999 Elsevier Science B.V. All rights reserved.