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- Q17131030 subject Q8234760.
- Q17131030 abstract "In algebraic geometry, a morphism of schemes f from X to Y is called quasi-separated if the diagonal map from X to X×YX is quasi-compact (meaning that the inverse image of any quasi-compact open set is quasi compact). A scheme X is called quasi-separated if the morphism to Spec Z is quasi-separated. Quasi-separated algebraic spaces and algebraic stacks and morphisms between them are defined in a similar way, though some authors include the condition that X is quasi-separated as part of the definition of an algebraic space or algebraic stack X. Quasi-separated morphisms were introduced by Grothendieck (1964, 1.2.1) as a generalization of separated morphisms.The concept of quasi-separated morphisms does not usually appear in introductory courses on algebraic geometry, because all separated morphisms (and all morphisms of Noetherian schemes) are automatically quasi-separated. However quasi-separated morphisms are more important for algebraic spaces and algebraic stacks, where many natural morphisms are quasi-separated but not separated.The condition that a morphism is quasi-separated often occurs together with the condition that it is quasi-compact.".
- Q17131030 wikiPageWikiLink Q1154351.
- Q17131030 wikiPageWikiLink Q4724016.
- Q17131030 wikiPageWikiLink Q7048762.
- Q17131030 wikiPageWikiLink Q7595945.
- Q17131030 wikiPageWikiLink Q8234760.
- Q17131030 comment "In algebraic geometry, a morphism of schemes f from X to Y is called quasi-separated if the diagonal map from X to X×YX is quasi-compact (meaning that the inverse image of any quasi-compact open set is quasi compact). A scheme X is called quasi-separated if the morphism to Spec Z is quasi-separated.".
- Q17131030 label "Quasi-separated morphism".