Connectivity properties of the Schur-Horn map for real Grassmannians

Abstract

To any V in the Grassmannian Grk( Rn) of k-dimensional vector subspaces in Rn one can associate the diagonal entries of the (n× n) matrix corresponding to the orthogonal projection of Rn to V. One obtains a map Grk( Rn) Rn (the Schur-Horn map). The main result of this paper is a criterion for pre-images of vectors in Rn to be connected. This will allow us to deduce connectivity criteria for a certain class of subspaces of the real Stiefel manifold which arise naturally in frame theory. We extend in this way results of Cahill, Mixon, and Strawn.