Optimal double stopping time
Abstract
We consider the optimal double stopping time problem defined for each stopping time S by v(S)=\E[(τ1, τ2) | S], τ1, τ2 ≥ S \. Following the optimal one stopping time problem, we study the existence of optimal stopping times and give a method to compute them. The key point is the construction of a new reward φ such that the value function v(S) satisfies v(S)=\E[φ(τ) | S], τ ≥ S \. Finally, we give an example of an american option with double exercise time.
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