English

PDE Methods For Optimal Skorokhod Embeddings

Analysis of PDEs 2019-03-19 v3

Abstract

We consider cost minimizing stopping time solutions to Skorokhod embedding problems, which deal with transporting a source probability measure to a given target measure through a stopped Brownian process. PDEs and a free boundary problem approach are used to address the problem in general dimensions with space-time inhomogeneous costs given by Lagrangian integrals along the paths. We introduce an Eulerian---mass flow---formulation of the problem, whose dual is given by Hamilton-Jacobi-Bellman type variational inequalities. Our key result is the existence (in a Sobolev class) of optimizers for this new dual problem, which in turn determines a free boundary, where the optimal Skorokhod transport drops the mass in space-time. This complements and provides a constructive PDE alternative to recent results of Beiglb\"ock, Cox, and Huesmann, and is a first step towards developing a general optimal mass transport theory involving mean field interactions and noise.

Keywords

Cite

@article{arxiv.1807.10347,
  title  = {PDE Methods For Optimal Skorokhod Embeddings},
  author = {Nassif Ghoussoub and Young-Heon Kim and Aaron Zeff Palmer},
  journal= {arXiv preprint arXiv:1807.10347},
  year   = {2019}
}

Comments

This version contains revisions based on comments from an anonymous referee for the journal Calculus of Variations and PDE

R2 v1 2026-06-23T03:16:00.759Z