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- Keel–Mori_theorem abstract "In algebraic geometry, the Keel–Mori theorem gives conditions for the existence of the quotient of an algebraic space by a group. The theorem was proved by Keel and Mori (1997).A consequence of the Keel–Mori theorem is the existence of a coarse moduli space of a separated algebraic stack, which is roughly a \"best possible\" approximation to the stack by a separated algebraic space.".
- Keel–Mori_theorem wikiPageExternalLink coarsespace.pdf.
- Keel–Mori_theorem wikiPageID "39560494".
- Keel–Mori_theorem wikiPageLength "1911".
- Keel–Mori_theorem wikiPageOutDegree "6".
- Keel–Mori_theorem wikiPageRevisionID "648259641".
- Keel–Mori_theorem wikiPageWikiLink Algebraic_geometry.
- Keel–Mori_theorem wikiPageWikiLink Algebraic_space.
- Keel–Mori_theorem wikiPageWikiLink Category:Theorems_in_algebraic_geometry.
- Keel–Mori_theorem wikiPageWikiLink Group_(mathematics).
- Keel–Mori_theorem wikiPageWikiLink Moduli_space.
- Keel–Mori_theorem wikiPageWikiLink Stack_(mathematics).
- Keel–Mori_theorem wikiPageWikiLinkText "Keel–Mori theorem".
- Keel–Mori_theorem wikiPageUsesTemplate Template:Citation.
- Keel–Mori_theorem wikiPageUsesTemplate Template:Harvs.
- Keel–Mori_theorem wikiPageUsesTemplate Template:Harvtxt.
- Keel–Mori_theorem subject Category:Theorems_in_algebraic_geometry.
- Keel–Mori_theorem comment "In algebraic geometry, the Keel–Mori theorem gives conditions for the existence of the quotient of an algebraic space by a group. The theorem was proved by Keel and Mori (1997).A consequence of the Keel–Mori theorem is the existence of a coarse moduli space of a separated algebraic stack, which is roughly a \"best possible\" approximation to the stack by a separated algebraic space.".
- Keel–Mori_theorem label "Keel–Mori theorem".
- Keel–Mori_theorem sameAs Q17098389.
- Keel–Mori_theorem sameAs m.0vxgkzy.
- Keel–Mori_theorem sameAs Q17098389.
- Keel–Mori_theorem wasDerivedFrom Keel–Mori_theorem?oldid=648259641.
- Keel–Mori_theorem isPrimaryTopicOf Keel–Mori_theorem.