Abstract
We explore properties of the value function and existence of optimal stopping times for functionals with discontinuities related to the boundary of an open (possibly unbounded) set O . The stopping horizon is either random, equal to the first exit from the set O , or fixed (finite or infinite). The payoff function is continuous with a possible jump at the boundary of O . Using a generalization of the penalty method, we derive a numerical algorithm for approximation of the value function for general Feller–Markov processes and show existence of optimal or ε -optimal stopping times.
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