Risk-averse control of undiscounted transient Markov models
Date
2014
Authors
Çavuş, Ö.
Ruszczyński, A.
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Abstract
We use Markov risk measures to formulate a risk-averse version of the undiscounted total cost problem for a transient controlled Markov process. Using the new concept of a multikernel, we derive conditions for a system to be risk transient, that is, to have finite risk over an infinite time horizon. We derive risk-averse dynamic programming equations satisfied by the optimal policy and we describe methods for solving these equations. We illustrate the results on an optimal stopping problem and an organ transplantation problem.
Source Title
SIAM Journal on Control and Optimization
Publisher
Society for Industrial and Applied Mathematics
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Keywords
Dynamic risk measures, Markov risk measures, Multikernels, Optimal stopping, Randomized policy, Stochastic shortest path, Dynamic programming, Markov processes, Risk analysis, Stochastic systems, Dynamic risk measure, Multikernels, Optimal stopping, Randomized policies, Risk measures, Stochastic shortest paths, Risk assessment
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Language
English