HOLOMORPHIC TANGENT BUNDLES AND NORMAL BUNDLES OF COMPLEX SUBMANIFOLDS OF COMPLEX PROJECTIVE SPACES : Dedicated to Professor Kisuke Tsuchida on his 70th birthday
スポンサーリンク
概要
- 論文の詳細を見る
"It is well known that the holomorphic tangent bundle and normal bundle of a complex submanifold of the complex Euclidean space are holomorphically isomorphic to pullbacks of the universal subbundle and quotient bundle, respectively, over the complex Grassmannian by means of its Gauss mapping. For a complex submanifold of the complex projective space, we shall prove a result (Theorem 5.1) corresponding to this fact."
- Yokohama City Universityの論文
- 1989-00-00
Yokohama City University | 論文
- STABILITY OF CONSTANT MEAN CURVATURE SURFACES IN RIEMANNIAN 3-SPACE FORM
- THREE-POINT BOUNDARY VALUE PROBLEMS-EXISTENCE AND UNIQUENESS
- ON CONDITIONS ON X SUCH THAT XAX* IS HERMITIAN
- A NOTE ON MALMQUIST'S THEOREM ON FIRST-ORDER DIFFERENTIAL EQUATIONS
- FURTHER RESULTS ON COMMON RIGHT FACTORS