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Holomorphic Vector Fields on Compact Kähler Manifolds

About this Title

Yozo Matsushima

Publication: CBMS Regional Conference Series in Mathematics
Publication Year: 1971; Volume 7
ISBNs: 978-0-8218-1656-1 (print); 978-1-4704-2367-4 (online)
DOI: https://doi.org/10.1090/cbms/007

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Table of Contents

Front/Back Matter

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Chapters

• Kähler Geometry
• Harmonic Forms
• The 1-form of type (0, 1) corresponding to a holomorphic vector field
• Laplacian $\Delta _f^{\prime \prime }$
• An integral formula
• The case $C_1(M)\le 0$
• The case $C_1(M)\ge 0$
• Study of $\mathrm {a}_f$
• Theorems of Lichnerowicz
• A remark on holomorphic vector fields on projective algebraic manifolds
• The Albanese variety of a Kähler manifold and the Jacobi map
• The case of Hodge manifolds
• $G$-sheaves
• The action of $\textrm {Aut}_0(M)$ on complex line bundles over $M$
• The Lie derivative of a complex line bundle
• The kernel of the homomorphism $p_F$
• Proof of the Blanchard Theorem