Regularity of free boundaries in optimal transportation

Shibing Chen, Jiakun Liu

Published 2019-11-25Version 1

In this paper, we obtain some regularities of the free boundary in optimal transportation with the quadratic cost. Our first result is about the $C^{1,\alpha}$ regularity of the free boundary for optimal partial transport between convex domains for densities $f, g$ bounded from below and above. When $f, g \in C^\alpha$, and $\partial\Omega, \partial\Omega^*\in C^{1,1}$ are far apart, by adopting our recent results on boundary regularity of Monge-Amp\`ere equations \cite{CLW1}, our second result shows that the free boundaries are $C^{2,\alpha}$. As an application, in the last we also obtain these regularities of the free boundary in an optimal transport problem with two separate targets.