An associated bundle approach to the Bures--Wasserstein geometry of fixed rank covariance matrices

Abstract

The Bures--Wasserstein geometry of covariance matrices provides a canonical distance on the statistical manifold of centred Gaussian measures and lies at the intersection of information geometry, quantum information, and optimal transport. The space of covariance matrices admits a natural stratified structure whose strata consist of fixed-rank covariance matrices. In this paper we focus on the rank-k stratum +(n,k) and revisit its geometry through the diffeomorphic associated-bundle model +(n,k)(n,k)×O(k)+(k). Working in this bundle picture, we (i) derive a system of differential equations for Bures--Wasserstein geodesics, (ii) prove that the fibers are totally geodesic and (iii) establish a one-to-one correspondence between Grassmannian logarithms and Bures--Wasserstein logarithms on +(n,k), and hence between minimizing geodesics in the two spaces. This alternative viewpoint clarifies the role of the underlying base (k,n) in the Bures--Wasserstein geometry of low-rank covariance matrices and sets the stage for further investigations into structured covariance models.