Rigid analytic spaces with overconvergent structure sheaf. (English) Zbl 0945.14013
It is known that the de Rham cohomology of a smooth rigid space \(X\), which admits a closed immersion into a polydisk without boundary is (generically) finite dimensional, and there is a Serre duality for \(X\). These fail for an affinoid smooth rigid space, which admits a closed immersion into a polydisk with boundary.
The author introduces a category of rigid spaces with an overconvergent structure sheaf, which improves this situation. Versions of the Serre and Poincaré duality are proved. An interpretation in terms of the new category is given for the rigid cohomology introduced recently by P. Berthelot.
The author introduces a category of rigid spaces with an overconvergent structure sheaf, which improves this situation. Versions of the Serre and Poincaré duality are proved. An interpretation in terms of the new category is given for the rigid cohomology introduced recently by P. Berthelot.
Reviewer: Anatoly N.Kochubei (Kiev)
MSC:
| 14G22 | Rigid analytic geometry |
| 32P05 | Non-Archimedean analysis |
| 32C36 | Local cohomology of analytic spaces |
Keywords:
rigid space; dagger space; Serre duality; overconvergent structure; de Rham cohomology; Poincaré dualityReferences:
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