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Monsky–Washnitzer_cohomology abstract "In algebraic geometry, Monsky–Washnitzer cohomology is a p-adic cohomology theory defined for non-singular affine varieties over fields of positive characteristic p introduced by Monsky and Washnitzer (1968) and Monsky (1968), who were motivated by the work of Dwork (1960). The idea is to lift the variety to characteristic 0, and then take a suitable subalgebra of the algebraic de Rham cohomology of Grothendieck (1966). The construction was simplified by van der Put (1986). Its extension to more general varieties is called rigid cohomology.".
Monsky–Washnitzer_cohomology wikiPageID "26005931".
Monsky–Washnitzer_cohomology wikiPageRevisionID "574665071".
Monsky–Washnitzer_cohomology author1Link "Paul Monsky".
Monsky–Washnitzer_cohomology author2Link "Gerard Washnitzer".
Monsky–Washnitzer_cohomology last "Monsky".
Monsky–Washnitzer_cohomology last "Washnitzer".
Monsky–Washnitzer_cohomology year "1968".
Monsky–Washnitzer_cohomology subject Category:Algebraic_geometry.
Monsky–Washnitzer_cohomology subject Category:Cohomology_theories.
Monsky–Washnitzer_cohomology subject Category:Homological_algebra.
Monsky–Washnitzer_cohomology comment "In algebraic geometry, Monsky–Washnitzer cohomology is a p-adic cohomology theory defined for non-singular affine varieties over fields of positive characteristic p introduced by Monsky and Washnitzer (1968) and Monsky (1968), who were motivated by the work of Dwork (1960). The idea is to lift the variety to characteristic 0, and then take a suitable subalgebra of the algebraic de Rham cohomology of Grothendieck (1966). The construction was simplified by van der Put (1986).".
Monsky–Washnitzer_cohomology label "Monsky–Washnitzer cohomology".
Monsky–Washnitzer_cohomology sameAs Monsky%E2%80%93Washnitzer_cohomology.
Monsky–Washnitzer_cohomology sameAs Q6902593.
Monsky–Washnitzer_cohomology sameAs Q6902593.
Monsky–Washnitzer_cohomology wasDerivedFrom Monsky–Washnitzer_cohomology?oldid=574665071.