2017
DOI: 10.1137/15m1047064
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Nonlinear PDE Approach to Time-Inconsistent Optimal Stopping

Abstract: We present a novel method for solving a class of time-inconsistent optimal stopping problems by reducing them to a family of standard stochastic optimal control problems. In particular, we convert an optimal stopping problem with a non-linear function of the expected stopping time in the objective into optimization over an auxiliary value function for a standard stochastic control problem with an additional state variable. This approach differs from the previous literature which primarily employs Lagrange mult… Show more

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Cited by 19 publications
(24 citation statements)
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“…For short surveys of time-inconsistent stopping problems we also refer to [1,9,34]. Recent papers on time-inconsistent stopping problems and the dynamic optimality and pre-commitment approaches include [31,34].…”
Section: Previous Literaturementioning
confidence: 99%
“…For short surveys of time-inconsistent stopping problems we also refer to [1,9,34]. Recent papers on time-inconsistent stopping problems and the dynamic optimality and pre-commitment approaches include [31,34].…”
Section: Previous Literaturementioning
confidence: 99%
“…In [9] a class of stopping problems -which can be seen as American options with guarantee -with the reward depending on the initial state are studied using a pre-commitment approach. We refer to [6,23,29,33] for short surveys of the literature on time-inconsistent problems.…”
Section: Previous Literaturementioning
confidence: 99%
“…We remark that [33] contains also a subgame perfect Nash equilibrium approach (based on Strotz's idea) for stopping problems, see mainly [33,Example 9]; this point is elaborated in the paragraph before Example 2.8 below. Timeinconsistent stopping problems with more general non-linear functions of the expected reward are studied in [29] using an approach which is inspired by [33].…”
Section: Previous Literaturementioning
confidence: 99%
“…Finally, a sophisticated agent who is able to commit simply solves the problem once at t = 0 and then sticks to the corresponding stopping plan. The problem of the last type, the so-called pre-committed agent, is actually a static (instead of dynamic) problem and has been solved in various contexts, such as optimal stopping under probability distortion in Xu and Zhou (2013), mean-variance portfolio selection in Zhou and Li (2000), optimal stopping with nonlinear constraint on expected time to stop in Miller (2017), and optimal control of conditional Value-at-Risk in Miller and Yang (2017). The goal of this paper is to study the behaviors of the first two types of agents.…”
Section: Naïve and Equilibrium Stopping Lawsmentioning
confidence: 99%