Nakano vanishing theorem

In mathematics, specifically in the study of vector bundles over complex Kähler manifolds, the Nakano vanishing theorem, sometimes called the Akizuki–Nakano vanishing theorem, generalizes the Kodaira vanishing theorem.^[1][2][3] Given a compact complex manifold M with a holomorphic line bundle F over M, the Nakano vanishing theorem provides a condition on when the cohomology groups ${\textstyle H^{q}(M;\Omega ^{p}(F))}$ equal zero. Here, ${\textstyle \Omega ^{p}(F)}$ denotes the sheaf of holomorphic (p,0)-forms taking values on F. The theorem states that, if the first Chern class of F is negative,$${\displaystyle H^{q}(M;\Omega ^{p}(F))=0{\text{ when }}q+p<n.}$$ Alternatively, if the first Chern class of F is positive,$${\displaystyle H^{q}(M;\Omega ^{p}(F))=0{\text{ when }}q+p>n.}$$

• Le Potier's vanishing theorem

• Akizuki, Yasuo; Nakano, Shigeo (1954). "Note on Kodaira-Spencer's proof of Lefschetz theorems". Proceedings of the Japan Academy. 30 (4): 266–272. doi:10.3792/pja/1195526105. ISSN 0021-4280.
• Nakano, Shigeo (1973). "Vanishing theorems for weakly 1-complete manifolds". Number theory, algebraic geometry and commutative algebra — in honor of Yasuo Akizuki. Kinokuniya. pp. 169–179.
• Nakano, Shigeo (1974). "Vanishing Theorems for Weakly 1-Complete Manifolds II". Publications of the Research Institute for Mathematical Sciences. 10 (1): 101–110. doi:10.2977/prims/1195192175.

This mathematical analysis–related article is a stub. You can help Wikipedia by expanding it.

• v
• t
• e