An inverse optimal stopping problem for diffusion processes
Abstract
Let be a one-dimensional diffusion and let be a payoff function depending on time and the value of . The paper analyzes the inverse optimal stopping problem of finding a time-dependent function such that a given stopping time is a solution of the stopping problem Under regularity and monotonicity conditions, there exists a solution if and only if is the first time when exceeds a time-dependent barrier , i.e. We prove uniqueness of the solution and derive a closed form representation. The representation is based on an auxiliary process which is a version of the original diffusion reflected at towards the continuation region. The results lead to a new integral equation characterizing the stopping boundary of the stopping problem .
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}
}