In mathematics, p-adic cohomology means a cohomology theory for varieties of characteristic p whose values are modules over a ring of p-adic integers. Examples (in roughly historical order) include:
- Serre's Witt vector cohomology
- Monsky–Washnitzer cohomology
- Infinitesimal cohomology
- Crystalline cohomology
- Rigid cohomology
YouTube Encyclopedic
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Peter Scholze: p-adic cohomology of the Lubin-Tate tower
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Takeshi Tsuji: On p-adic étale cohomology of perverse sheaves
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A New Approach to the Local Langlands Correspondence for GLnGLn Over p-Adic Fields - Peter Scholze
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See also
- p-adic Hodge theory
- Étale cohomology, taking values over a ring of l-adic integers for l≠p
This page was last edited on 13 January 2020, at 09:31