1998
DOI: 10.1016/s0012-9593(98)80004-9
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Weights in rigid cohomology applications to unipotent F-isocrystals

Abstract: Weights in rigid cohomology applications to unipotent F-isocrystals Annales scientifiques de l'É.N.S. 4 e série, tome 31, n o 5 (1998), p. 683-715 © Gauthier-Villars (Éditions scientifiques et médicales Elsevier), 1998, tous droits réservés. L'accès aux archives de la revue « Annales scientifiques de l'É.N.S. » (http://www. elsevier.com/locate/ansens) implique l'accord avec les conditions générales d'utilisation (http://www.numdam.org/conditions). Toute u… Show more

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Cited by 26 publications
(21 citation statements)
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“…The upshot of the previous section is that we now have an affine group scheme π rig 1 (X/S, p) over the Tannakian category F-Isoc † (S/K) whose fibre (ignoring Frobenius structures) over any closed point s is the usual rigid fundamental group π rig 1 (X s , p s ) as defined by Chiarellotto and le Stum in [CLS99a]. In Chapter II of [Chi98], Chiarellotto defines a Frobenius isomorphism F * : π rig 1 (X s , p s ) ∼ → π rig 1 (X s , p s ), by using the fact that Frobenius pullback induces an automorphism of the category N Isoc † (X s /K). Since we have constructed π rig 1 (X/S, p) as an affine group scheme over F-Isoc † (S/K), it comes with a Frobenius structure that we can compare with Chiarellotto's.…”
Section: Extension To Proper Curves Frobenius Structuresmentioning
confidence: 99%
“…The upshot of the previous section is that we now have an affine group scheme π rig 1 (X/S, p) over the Tannakian category F-Isoc † (S/K) whose fibre (ignoring Frobenius structures) over any closed point s is the usual rigid fundamental group π rig 1 (X s , p s ) as defined by Chiarellotto and le Stum in [CLS99a]. In Chapter II of [Chi98], Chiarellotto defines a Frobenius isomorphism F * : π rig 1 (X s , p s ) ∼ → π rig 1 (X s , p s ), by using the fact that Frobenius pullback induces an automorphism of the category N Isoc † (X s /K). Since we have constructed π rig 1 (X/S, p) as an affine group scheme over F-Isoc † (S/K), it comes with a Frobenius structure that we can compare with Chiarellotto's.…”
Section: Extension To Proper Curves Frobenius Structuresmentioning
confidence: 99%
“…The associated spectral sequence for the cohomology of A • • then reads, using the (quasi)isomorphisms (1) Proof: Assertions (i), (iii) and (iv) follow easily from the spectral sequence (4) (which in cases (iii) and (iv) is Frobenius equivariant) and the corresponding results for the rigid cohomology with constant coefficients of (classically smooth) k-schemes, see [4] [5]. For (ii) observe that we can repeat all constructions using rigid spaces instead of dagger spaces, obtaining the spectral sequence…”
Section: Choose An Open Coveringmentioning
confidence: 99%
“…This now follows from the theory of weights. By [ClS98] and [Chi97] the K 0 -linear Frobenius, which is a power of φ, has weight j when acting on H j rig (X κ /K 0 ) when X is proper and has mixed weights between j and 2j in general. In the proper case it follows that if 2n = j for j = i − 2, i − 1 and i, then the operator φ/p n has no fixed vector on H j rig (X κ /K 0 ) because some power of it does not.…”
Section: It Follows That the Mapmentioning
confidence: 99%