Bures Geodesics and Restricted Barycenters for Kronecker Positive Definite Matrices

Abstract

We study the extrinsic Bures--Wasserstein geometry of the determinant-normalized Kronecker model n=\V U:U,V∈n,\ U=1\⊂n2, asking when the ambient Bures geodesic between two Kronecker positive definite matrices can remain in this lower-dimensional model. Local membership near an endpoint is shown to be equivalent to membership of the whole segment, and this happens exactly in the one-factor cases: either U1=U0 or V1 is a positive scalar multiple of V0. Consequently, any endpoint pair not confined to these one-factor alternatives leaves the model immediately. The criterion is expressed by a partial-trace residual. In fixed commuting charts it becomes an equivalent rank-one square-root profile and yields computable departure diagnostics. We also obtain exact formulas for two restricted barycenter problems: fixed commuting-coordinate slices, solved by Perron singular vectors, and one-factor subfamilies, reduced to standard Bures--Wasserstein barycenters on n.