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A Dynamic Programming Principle for Distribution-Constrained Optimal Stopping
Published 24 Mar 2017 in math.OC and q-fin.MF | (1703.08534v1)
Abstract: We consider an optimal stopping problem where a constraint is placed on the distribution of the stopping time. Reformulating the problem in terms of so-called measure-valued martingales allows us to transform the marginal constraint into an initial condition and view the problem as a stochastic control problem; we establish the corresponding dynamic programming principle.
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