State-constrained stochastic optimal control problems via reachability approach

2016
Publication type:
Paper in peer-reviewed journals
Journal:
SIAM Journal on Control and Optimization, vol. 54 (5), pp. 2568–2593
Keywords :
49L25; 93E20; 35K55; stochastic optimal control; viscosity notion; Hamilton-Jacobi equations; state-constraints; stochastic target problems AMS subject classifications: 49L20;
Abstract:
This paper deals with a class of stochastic optimal control problems (SOCP) in presence of state-constraints. It is well-known that for such problems the value function is, in general, discontinuous and its characterization by a Hamilton-Jacobi equation requires additional assumptions involving an interplay between the boundary of the set of constraints and the dynamics of the controlled system. Here, we give a characterization of the epigraph of the value function without assuming the usual controllability assumptions. For this end, the SOCP is first translated into a state-constrained stochastic target problem. Then a level-set approach is used to describe the backward reachable sets of the new target problem. It turns out that these backward-reachable sets describe the value function. The main advantage of our approach is that it allows to handle easily the state constraints by an exact penalization. However, the target problem involves a new state variable and a new control variable that is unbounded.
BibTeX:
@article{Bok-Pic-Zid-2016,
    author={Olivier Bokanowski and Athena Picarelli and Hasnaa Zidani },
    title={State-constrained stochastic optimal control problems via 
           reachability approach },
    doi={10.1137/15M1023737 },
    journal={SIAM Journal on Control and Optimization },
    year={2016 },
    volume={54 (5) },
    pages={2568–2593},
}