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Voevodsky motives and ldh-descent
This work applies Gabber's theorem on alterations to Voevodsky's work on mixed motives. We extend many fundamental theorems to DM(k, Z[1/p]) where p is the exponential characteristic of the perfect field k. Two applications are an isomorphism of Suslin that compares higher Chow groups and...
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| Auteur principal : | |
|---|---|
| Format : | Livre |
| Langue : | anglais |
| Titre complet : | Voevodsky motives and ldh-descent / Shane Kelly |
| Publié : |
Paris :
Société mathématique de France
, DL 2017 |
| Description matérielle : | 1 vol. (125 p.) |
| Collection : | Astérisque ; 391 |
| Sujets : | |
| Documents associés : | Fait partie de l'ensemble:
Astérisque |
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| 200 | 1 | |a Voevodsky motives and ldh-descent |f Shane Kelly | |
| 210 | |a Paris |c Société mathématique de France |d DL 2017 | ||
| 215 | |a 1 vol. (125 p.) |d 25 cm | ||
| 305 | |a N° de : "Astérisque", ISSN 0303-1179, (2017) n° 391 | ||
| 320 | |a Bibliogr. p. [119]-125 | ||
| 330 | |a This work applies Gabber's theorem on alterations to Voevodsky's work on mixed motives. We extend many fundamental theorems to DM(k, Z[1/p]) where p is the exponential characteristic of the perfect field k. Two applications are an isomorphism of Suslin that compares higher Chow groups and étale cohomology, and calculation of the motivic Steenrod algebra. | ||
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