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arxiv: 2103.14727 · v1 · pith:AYLB2BN3new · submitted 2021-03-26 · 📡 eess.SY · cs.AI· cs.SY· math.OC· math.PR

Risk-Averse Stochastic Shortest Path Planning

classification 📡 eess.SY cs.AIcs.SYmath.OCmath.PR
keywords costpoliciescoherentconsiderpathplanningproblemrisk
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We consider the stochastic shortest path planning problem in MDPs, i.e., the problem of designing policies that ensure reaching a goal state from a given initial state with minimum accrued cost. In order to account for rare but important realizations of the system, we consider a nested dynamic coherent risk total cost functional rather than the conventional risk-neutral total expected cost. Under some assumptions, we show that optimal, stationary, Markovian policies exist and can be found via a special Bellman's equation. We propose a computational technique based on difference convex programs (DCPs) to find the associated value functions and therefore the risk-averse policies. A rover navigation MDP is used to illustrate the proposed methodology with conditional-value-at-risk (CVaR) and entropic-value-at-risk (EVaR) coherent risk measures.

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