On the anti-canonical geometry of \(\mathbb{Q}\)-Fano threefolds
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Publication:333246
DOI10.4310/jdg/1473186539zbMath1375.14137arXiv1408.6349OpenAlexW3100448940WikidataQ115166618 ScholiaQ115166618MaRDI QIDQ333246
Publication date: 28 October 2016
Published in: Journal of Differential Geometry (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1408.6349
Related Items (10)
On birational geometry of minimal threefolds with numerically trivial canonical divisors ⋮ Remark on complements on surfaces ⋮ ON THE ANTI-CANONICAL GEOMETRY OF WEAK -FANO THREEFOLDS, III ⋮ Anticanonical volumes of Fano 4-folds ⋮ Characterizing terminal Fano threefolds with the smallest anti-canonical volume ⋮ Arithmetic and geometric deformations of threefolds ⋮ On the anti-canonical geometry of weak \(\mathbb{Q}\)-Fano threefolds. II ⋮ Second Chern class of Fano manifolds and anti-canonical geometry ⋮ The Noether inequality for algebraic \(3\)-folds. With an appendix by János Kollár. ⋮ On anticanonical volumes of weak Q-Fano terminal threefolds of Picard rank two
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