English

An inverse optimal stopping problem for diffusion processes

Optimization and Control 2017-08-08 v3 Probability Economics

Abstract

Let XX be a one-dimensional diffusion and let g ⁣:[0,T]×RRg\colon[0,T]\times\mathbb{R}\to\mathbb{R} be a payoff function depending on time and the value of XX. The paper analyzes the inverse optimal stopping problem of finding a time-dependent function π:[0,T]R\pi:[0,T]\to\mathbb{R} such that a given stopping time τ\tau^{\star} is a solution of the stopping problem supτE[g(τ,Xτ)+π(τ)].\sup_{\tau}\mathbb{E}\left[g(\tau,X_{\tau})+\pi(\tau)\right]\,. Under regularity and monotonicity conditions, there exists a solution π\pi if and only if τ\tau^{\star} is the first time when XX exceeds a time-dependent barrier bb, i.e. τ=inf{t0Xtb(t)}.\tau^{\star}=\inf\left\{ t\ge0\,|\,X_{t}\ge b(t)\right\} \,. We prove uniqueness of the solution π\pi and derive a closed form representation. The representation is based on an auxiliary process which is a version of the original diffusion XX reflected at bb towards the continuation region. The results lead to a new integral equation characterizing the stopping boundary bb of the stopping problem supτE[g(τ,Xτ)]\sup_{\tau}\mathbb{E}\left[g(\tau,X_{\tau})\right].

Keywords

Cite

@article{arxiv.1406.0209,
  title  = {An inverse optimal stopping problem for diffusion processes},
  author = {Thomas Kruse and Philipp Strack},
  journal= {arXiv preprint arXiv:1406.0209},
  year   = {2017}
}
R2 v1 2026-06-22T04:27:56.278Z