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- Q6379606 subject Q8851964.
- Q6379606 abstract "In algebraic geometry, the Kawamata–Viehweg vanishing theorem is an extension of the Kodaira vanishing theorem, on the vanishing of coherent cohomology groups, to logarithmic pairs, proved independently by Viehweg (1982) and Kawamata (1982).The theorem states that if L is a big nef line bundle (for example, an ample line bundle) on a complex projective manifold with canonical line bundle K,then the coherent cohomology groups Hi(L⊗K) vanish for all positive i.".
- Q6379606 wikiPageExternalLink ?PPN=PPN243919689_0335&DMDID=dmdlog4.
- Q6379606 wikiPageWikiLink Q1198376.
- Q6379606 wikiPageWikiLink Q1368270.
- Q6379606 wikiPageWikiLink Q1509762.
- Q6379606 wikiPageWikiLink Q180969.
- Q6379606 wikiPageWikiLink Q2518048.
- Q6379606 wikiPageWikiLink Q4748472.
- Q6379606 wikiPageWikiLink Q5995023.
- Q6379606 wikiPageWikiLink Q6667314.
- Q6379606 wikiPageWikiLink Q6987000.
- Q6379606 wikiPageWikiLink Q703577.
- Q6379606 wikiPageWikiLink Q844128.
- Q6379606 wikiPageWikiLink Q8851964.
- Q6379606 comment "In algebraic geometry, the Kawamata–Viehweg vanishing theorem is an extension of the Kodaira vanishing theorem, on the vanishing of coherent cohomology groups, to logarithmic pairs, proved independently by Viehweg (1982) and Kawamata (1982).The theorem states that if L is a big nef line bundle (for example, an ample line bundle) on a complex projective manifold with canonical line bundle K,then the coherent cohomology groups Hi(L⊗K) vanish for all positive i.".
- Q6379606 label "Kawamata–Viehweg vanishing theorem".