Classification of holomorphic spheres of constant curvature in complex Grassmann manifold G2,5 |
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| Authors: | G |
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| Affiliation: | Department of Mathematics, Graduate School, Chinese Academy of Sciences, Beijing 100039, China |
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| Abstract: | In this paper, we classify all nonsingular holomorphic spheres in complex Grassmann manifolds G2,5 with the induced constant curvatures K=4, 2, 4/3,1 and 4/5 into some classes, up to unitary equivalence, in which none of the spheres are congruent; At the same time we also prove that there does not exist the nonsingular holomorphic sphere in G2,5 with constant curvature 2/3. |
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| Keywords: | Author Keywords: Gauss curvature Nonsingular holomorphic sphere Veronese curve Classification Complex Grassmann manifold |
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