The Geometry and Topology on Grassmann Manifolds

Abstract

This paper shows that the Grassmann Manifolds G F(n,N) can all be imbedded in an Euclidean space M F(N) naturally and the imbedding can be realized by the eigenfunctions of Laplacian on G F(n,N). They are all minimal submanifolds in some spheres of M F(N) respectively. Using these imbeddings, we construct some degenerate Morse functions on Grassmann Manifolds, show that the homology of the complex and quaternion Grassmann Manifolds can be computed easily.

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