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Mean Field Markov Decision Processes

Nicole Bäuerle

2023Applied Mathematics & Optimization14 citationsDOIOpen Access PDF

Abstract

Abstract We consider mean-field control problems in discrete time with discounted reward, infinite time horizon and compact state and action space. The existence of optimal policies is shown and the limiting mean-field problem is derived when the number of individuals tends to infinity. Moreover, we consider the average reward problem and show that the optimal policy in this mean-field limit is $$\varepsilon $$ <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML"> <mml:mi>ε</mml:mi> </mml:math> -optimal for the discounted problem if the number of individuals is large and the discount factor close to one. This result is very helpful, because it turns out that in the special case when the reward does only depend on the distribution of the individuals, we obtain a very interesting subclass of problems where an average reward optimal policy can be obtained by first computing an optimal measure from a static optimization problem and then achieving it with Markov Chain Monte Carlo methods. We give two applications: Avoiding congestion an a graph and optimal positioning on a market place which we solve explicitly.

Topics & Concepts

MathematicsMarkov decision processOptimal controlInfinityMathematical optimizationMarkov chainLimit (mathematics)Discrete time and continuous timeState spaceField (mathematics)Mean field theoryTime horizonDiscountingApplied mathematicsMarkov processStatisticsPure mathematicsMathematical analysisEconomicsQuantum mechanicsPhysicsFinanceMarkov Chains and Monte Carlo MethodsStochastic processes and financial applicationsEconomic theories and models
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