We treat the problem of risk-aware control for stochastic shortest path (SSP) on Markov decision processes (MDP). Typically, expectation is considered for SSP, which however is oblivious to the incurred risk. We present an alternative view, instead optimizing conditional value-at-risk (CVaR), an established risk measure. We treat both Markov chains as well as MDP and introduce, through novel insights, two algorithms, based on linear programming and value iteration, respectively. Both algorithms offer precise and provably correct solutions. Evaluation of our prototype implementation shows that risk-aware control is feasible on several moderately sized models
In the setting of stochastic recourse programs, we consider the problem of minimizing the probabilit...
This paper presents an approach to shortest path minimization for graphs with random weights of arcs...
Abstract—In this paper, we consider a class of stochas-tic optimal control problems with risk constr...
Abstract — Next generation industrial plants will feature mo-bile robots (e.g., autonomous forklifts...
We consider the stochastic shortest path (SSP)problem for succinct Markov decision processes(MDPs), ...
In this invited contribution, we revisit the stochastic shortest path problem, and show how recent r...
The classical optimal control problems for discrete-time, transient Markov processes are infinite ho...
The stochastic shortest path problem lies at the heart of many questions in the formal verification ...
The stochastic shortest path problem (SSPP) asks to resolve the non-deterministic choices in a Marko...
International audienceThe stochastic shortest path problem (SSPP) asks to resolve the non-determinis...
International audienceThe paper deals with finite-state Markov decision processes (MDPs) with intege...
A numerically tractable Stochastic Model Predictive Control (SMPC) strategy using Conditional Value ...
In this thesis, we develop theoretical foundations of the theory of dynamic risk measures for contro...
We consider the problem of designing policies for partially observable Markov decision processes (PO...
In the setting of stochastic recourse programs, we consider the problem of minimizing the probabilit...
This paper presents an approach to shortest path minimization for graphs with random weights of arcs...
Abstract—In this paper, we consider a class of stochas-tic optimal control problems with risk constr...
Abstract — Next generation industrial plants will feature mo-bile robots (e.g., autonomous forklifts...
We consider the stochastic shortest path (SSP)problem for succinct Markov decision processes(MDPs), ...
In this invited contribution, we revisit the stochastic shortest path problem, and show how recent r...
The classical optimal control problems for discrete-time, transient Markov processes are infinite ho...
The stochastic shortest path problem lies at the heart of many questions in the formal verification ...
The stochastic shortest path problem (SSPP) asks to resolve the non-deterministic choices in a Marko...
International audienceThe stochastic shortest path problem (SSPP) asks to resolve the non-determinis...
International audienceThe paper deals with finite-state Markov decision processes (MDPs) with intege...
A numerically tractable Stochastic Model Predictive Control (SMPC) strategy using Conditional Value ...
In this thesis, we develop theoretical foundations of the theory of dynamic risk measures for contro...
We consider the problem of designing policies for partially observable Markov decision processes (PO...
In the setting of stochastic recourse programs, we consider the problem of minimizing the probabilit...
This paper presents an approach to shortest path minimization for graphs with random weights of arcs...
Abstract—In this paper, we consider a class of stochas-tic optimal control problems with risk constr...