Existence for the Supercooled Stefan Problem in General Dimensions
Abstract
We prove the global-time existence of weak solutions to the supercooled Stefan problem. Our result holds in general space dimensions and with a general class of initial data. In addition, our solution is maximal in the sense of a certain stochastic order, among all comparable weak solutions starting from the same initial data. Our approach is based on a free target optimization problem for Brownian stopping times, where the main idea is to introduce a superharmonic cost function in the optimization problem. We will show that our choice of the cost function causes the target measure to accumulate near the prescribed domain boundary as much as possible. A central ingredient in our proof lies in the usage of dual problem: we prove the dual attainment and use the dual optimal solution to characterize the primal optimal solution. It follows in turn that the underlying particle dynamics yields a solution to the supercooled Stefan problem.
Cite
@article{arxiv.2402.17154,
title = {Existence for the Supercooled Stefan Problem in General Dimensions},
author = {Sunhi Choi and Inwon C. Kim and Young-Heon Kim},
journal= {arXiv preprint arXiv:2402.17154},
year = {2026}
}
Comments
In this revision: - Several errors are fixed, especially regarding the definition of maximal solutions, and the proof of dual attainment. - The statement of the main theorem is slightly changed to reflect a subtle point regarding the initial domain. - There are various improvements in the exposition