Weil-étale cohomology: Difference between revisions
Jump to navigation
Jump to search
imported>Giovanni Antonio DiMatteo (creating the page) |
mNo edit summary |
||
(4 intermediate revisions by 2 users not shown) | |||
Line 1: | Line 1: | ||
In (date), a new [[Grothendieck topology]] was introduced by S. Lichtenbaum, defined on the category of schemes of finite type over a finite field. Its construction bears the same relation to the [[Étale morphism|étale topology]] as the [[Weil group]] does to the Galois group. | {{subpages}} | ||
In (date), a new [[Grothendieck topology]] was introduced by S. Lichtenbaum, defined on the category of schemes of finite type over a finite field. Its construction bears the same relation to the [[Étale morphism|étale topology]] as the [[Weil group]] does to the [[Galois group]]. | |||
==The Weil-étale site== | ==The Weil-étale site== | ||
Line 6: | Line 7: | ||
==The Lichtenbaum conjectures== | ==The Lichtenbaum conjectures== | ||
It was conjectured that the Weil-étale cohomology groups could be used in computing values of zeta functions. | |||
==References== | ==References== | ||
* Lichtenbaum, Stephen. (date) ''The Weil-Étale Topology'', (preprint?). | * Lichtenbaum, Stephen. (date) ''The Weil-Étale Topology'', (preprint?). | ||
* Lichtenbaum, Stephen. (2005) ''The Weil-Étale Topology for Number Rings'', (preprint?). | * Lichtenbaum, Stephen. (2005) ''The Weil-Étale Topology for Number Rings'', (preprint?). | ||
* Geisser, Thomas. ''Weil-Étale Cohomology over Finite Fields'' | |||
* Geisser, Thomas. ''Motivic Weil-Étale Cohomology'' | |||
[[Category: | [[Category:Suggestion Bot Tag]] | ||
Latest revision as of 07:01, 7 November 2024
In (date), a new Grothendieck topology was introduced by S. Lichtenbaum, defined on the category of schemes of finite type over a finite field. Its construction bears the same relation to the étale topology as the Weil group does to the Galois group.
The Weil-étale site
Weil-étale sheaves and cohomology
The Lichtenbaum conjectures
It was conjectured that the Weil-étale cohomology groups could be used in computing values of zeta functions.
References
- Lichtenbaum, Stephen. (date) The Weil-Étale Topology, (preprint?).
- Lichtenbaum, Stephen. (2005) The Weil-Étale Topology for Number Rings, (preprint?).
- Geisser, Thomas. Weil-Étale Cohomology over Finite Fields
- Geisser, Thomas. Motivic Weil-Étale Cohomology