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MOR
2008

On Near Optimality of the Set of Finite-State Controllers for Average Cost POMDP

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On Near Optimality of the Set of Finite-State Controllers for Average Cost POMDP
We consider the average cost problem for partially observable Markov decision processes (POMDP) with finite state, observation, and control spaces. We prove that there exists an -optimal finite-state controller functionally independent of initial distributions for any > 0, under the assumption that the optimal liminf average cost function of the POMDP is constant. As part of our proof, we establish that if the optimal liminf average cost function is constant, then the optimal limsup average cost function is also constant, and the two are equal. We also discuss the connection between the existence of nearly optimal finite-history controllers and two other important issues for average cost POMDP: the existence of an average cost that is independent of the initial state distribution, and the existence of a bounded solution to the constant average cost optimality equation. May 2006 Revised: March, May 2007 Huizhen Yu was with the Laboratory for Information and Decision Systems (LIDS), ...
Huizhen Yu, Dimitri P. Bertsekas
Added 13 Dec 2010
Updated 13 Dec 2010
Type Journal
Year 2008
Where MOR
Authors Huizhen Yu, Dimitri P. Bertsekas
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