JOURNAL ARTICLE
Geodesics in infinite dimensional Stiefel and Grassmann manifolds
Year: 2012 Journal: Comptes Rendus Mathématique Vol: 350 (15-16)Pages: 773-776 Publisher: Elsevier BV
Abstract
Let V be a separable Hilbert space, possibly infinite dimensional. Let St(p,V) be the Stiefel manifold of orthonormal frames of p vectors in V , and let Gr(p,V) be the Grassmann manifold of p -dimensional subspaces of V . We study the distance and the geodesics in these manifolds, by reducing the matter to the finite dimensional case. We then prove that any two points in those manifolds can be connected by a minimal geodesic, and characterize the cut locus.
Keywords:
Mathematics Stiefel manifold Geodesic Linear subspace Grassmannian Combinatorics Hilbert space Pure mathematics Dimension (graph theory) Tangent space Separable space Orthonormal basis Mathematical analysis Physics
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