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:
Étale cohomology, taking values over a ring of l-adic integers for l≠p
This article includes a list of related items that share the same name (or similar names). If an internal link incorrectly led you here, you may wish to change the link to point directly to the intended article.
March 04, 2023
adic, cohomology, mathematics, means, cohomology, theory, varieties, characteristic, whose, values, modules, over, ring, adic, integers, examples, roughly, historical, order, include, serre, witt, vector, cohomology, monsky, washnitzer, cohomology, infinitesim. 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 cohomologySee also Editp adic Hodge theory Etale cohomology taking values over a ring of l adic integers for l p This article includes a list of related items that share the same name or similar names If an internal link incorrectly led you here you may wish to change the link to point directly to the intended article Retrieved from https en wikipedia org w index php title P adic cohomology amp oldid 935561255, wikipedia, wiki, book, books, library,
