On a general matrix-valued unbalanced optimal transport problem
Abstract
We introduce a general class of transport distances over the space of positive semi-definite matrix-valued Radon measures , called the weighted Wasserstein-Bures distance. Such a distance is defined via a generalized Benamou-Brenier formulation with a weighted action functional and an abstract matricial continuity equation, which leads to a convex optimization problem. Some recently proposed models, including the Kantorovich-Bures distance and the Wasserstein-Fisher-Rao distance, can naturally fit into ours. We give a complete characterization of the minimizer and explore the topological and geometrical properties of the space . In particular, we show that is a complete geodesic space and exhibits a conic structure.
Cite
@article{arxiv.2011.05845,
title = {On a general matrix-valued unbalanced optimal transport problem},
author = {Bowen Li and Jun Zou},
journal= {arXiv preprint arXiv:2011.05845},
year = {2023}
}
Comments
For readability, it is split into two parts; the second part for numerics is in arXiv:2310.09420