Étale morphism: Difference between revisions
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==The Weil Conjectures== | ==The Weil Conjectures== | ||
Revision as of 19:20, 5 December 2007
The Weil Conjectures
Definition
The following conditions are equivalent for a morphism of schemes :
- is flat and unramified.
- is flat and the sheaf of Kähler differentials .
The small étale site
The category of étale -schemes becomes a Grothendieck topology, if one defines the sets of coverings to be jointly-surjective collections of -morphisms ; i.e., such that the union of images covers . That this forms a grothendieck essentially follows from the following three facts:
- Open immersions are étale.
- The étale property lifts by base change: that is, if is an étale morphism, and is any morphism, then the canonical fibered projection is again étale.
- If and are such that is étale, then is étale as well.