Title:Bi-Lipschitz embeddings of the space of unordered $m$-tuples with a partial transportation metric

Abstract:Let $\Omega\subset \mathbb{R}^n$ be non-empty, open and proper. Consider $Wb(\Omega)$, the space of finite Borel measures on $\Omega$ equipped with the partial transportation metric introduced by Figalli and Gigli that allows the creation and destruction of mass on $\partial \Omega$. Equivalently, we show that $Wb(\Omega)$ is isometric to a subset of all Borel measures with the ordinary Wasserstein distance, on the one point completion of $\Omega$ equipped with the shortcut metric \[\delta(x,y)= \min\{\|x-y\|, \operatorname{dist}(x,\partial \Omega)+\operatorname{dist}(y,\partial\Omega)\}.\] In this article we construct bi-Lipschitz embeddings of the set of unordered $m$-tuples in $Wb(\Omega)$ into Hilbert space. This generalises Almgren's bi-Lipschitz embedding theorem to the setting of optimal partial transport.