In every finite-state leavable gambling problem and in every finite-state Markov decision process with discounted, negative or positive reward criteria there exists a Markov strategy which is monotonically improving and optimal in the limit along every history. An example is given to show that for the positive and gambling cases such strategies cannot be constructed by simply switching to a "better" action or gamble at each successive return to a state
International audienceIn several standard models of dynamic programming (gambling houses, MDPs, POMD...
The paper studies optimization of average-reward continuous-time finite state and action Markov Deci...
In this paper the following result is proved. In any total reward countable state Markov decision pr...
In every finite-state leavable gambling problem and in every finite-state Markov decision process wi...
In every finite-state leavable gambling problem and in every finite-state Markov decision process wi...
Suppose you are in a casino with a number of dollars you wish to gamble. You may quit whenever you p...
AbstractThis paper deals with a discrete time Markov decision model with a finite state space, arbit...
We consider the relationship between the reward function and the existence of (nearly) optimal Marko...
We consider a discrete time Markov Decision Process with infinite horizon. The criterion to be maxim...
This paper gives a systematic treatment of results about the existence of various types of nearly-op...
This paper lays down conceptual groundwork for optimal choice in infinite-horizon finite-state Marko...
In several standard models of dynamic programming (gambling houses, MDPs, POMDPs), we prove the exis...
summary:In this paper there are considered Markov decision processes (MDPs) that have the discounted...
International audienceIn several standard models of dynamic programming (gambling houses, MDPs, POMD...
The paper studies optimization of average-reward continuous-time finite state and action Markov Deci...
In this paper the following result is proved. In any total reward countable state Markov decision pr...
In every finite-state leavable gambling problem and in every finite-state Markov decision process wi...
In every finite-state leavable gambling problem and in every finite-state Markov decision process wi...
Suppose you are in a casino with a number of dollars you wish to gamble. You may quit whenever you p...
AbstractThis paper deals with a discrete time Markov decision model with a finite state space, arbit...
We consider the relationship between the reward function and the existence of (nearly) optimal Marko...
We consider a discrete time Markov Decision Process with infinite horizon. The criterion to be maxim...
This paper gives a systematic treatment of results about the existence of various types of nearly-op...
This paper lays down conceptual groundwork for optimal choice in infinite-horizon finite-state Marko...
In several standard models of dynamic programming (gambling houses, MDPs, POMDPs), we prove the exis...
summary:In this paper there are considered Markov decision processes (MDPs) that have the discounted...
International audienceIn several standard models of dynamic programming (gambling houses, MDPs, POMD...
The paper studies optimization of average-reward continuous-time finite state and action Markov Deci...
In this paper the following result is proved. In any total reward countable state Markov decision pr...