Nakano vanishing theorem

Template:Short description 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 $H^q(M;{\mathrm{\Omega }}^p(F))$ equal zero. Here, ${\mathrm{\Omega }}^p(F)$ 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,$${\displaystyle H^q(M;{\mathrm{\Omega }}^p(F))=0\text{ when }q+p<n.}$$ Alternatively, if the first Chern class of F is positive,$${\displaystyle H^q(M;{\mathrm{\Omega }}^p(F))=0\text{ when }q+p>n.}$$

• Le Potier's vanishing theorem

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