On polarized 4-folds \((X,L)\) with \(h^0(K_X + 3L)=1\)
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Publication:890659
DOI10.1016/j.jpaa.2015.08.014zbMath1327.14039OpenAlexW1621485187MaRDI QIDQ890659
Publication date: 10 November 2015
Published in: Journal of Pure and Applied Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jpaa.2015.08.014
Related Items (3)
On the positivity of the dimension of the global sections of adjoint bundle for quasi-polarized manifold with numerically trivial canonical bundle ⋮ On the dimension of the global sections of adjoint bundles for quasi-polarized manifold whose anti-canonical bundle is effective, nef and big ⋮ ON THE DIMENSION OF THE GLOBAL SECTIONS OF THE ADJOINT BUNDLE FOR POLARIZED 5-FOLDS
Cites Work
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- On a conjecture of Beltrametti-Sommese for polarized 4-folds
- On quasi-polarized manifolds whose sectional genus is equal to the irregularity
- Ample vector bundles of small \(c_ 1\)-sectional genera
- A study on the dimension of global sections of adjoint bundles for polarized manifolds
- On the dimension of global sections of adjoint bundles for polarized 3-folds and 4-folds
- Rational connectedness and boundedness of Fano manifolds
- The adjunction theory of complex projective varieties
- A formula for the sectional geometric genus of quasi-polarized manifolds by using intersection numbers
- Fundamental divisors on Fano varieties of index \(n - 3\)
- On a conjecture of Beltrametti and Sommese
- On the Sectional Geometric Genus of Quasi-Polarized Varieties. I
- Generalized adjunction and applications
- Families of rationally connected varieties
- Connexité rationnelle des variétés de Fano
- ON A CONJECTURE OF BELTRAMETTI–SOMMESE FOR POLARIZED 3-FOLDS
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