Quantitative geometric stability for semi-discrete optimal transport
Presenter
May 16, 2022
Event: Applied Optimal Transport
Abstract
I will discuss two stability results on the geometric structures (Laguerre cells) arising in optimal transport problems with discrete target measure. Our results consist of two types of stability: one evaluates differences in a measure sense, while the second in Hausdorff distance; these results come with quantitative bounds under perturbation of the masses of the target measure. This talk consists of joint work with Mohit Bansil (UCLA).