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 Paul Monsky and Gerard Washnitzer and , who were motivated by the work of Bernard Dwork. The idea is to lift the variety to characteristic 0, and then take a suitable subalgebra of the algebraic de Rham cohomology of . The construction was simplified by . Its extension to more general varieties is called rigid cohomology.
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| - Monsky–Washnitzer cohomology (en)
- Monsky–Washnitzerkohomologi (sv)
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| - 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 Paul Monsky and Gerard Washnitzer and , who were motivated by the work of Bernard Dwork. The idea is to lift the variety to characteristic 0, and then take a suitable subalgebra of the algebraic de Rham cohomology of . The construction was simplified by . Its extension to more general varieties is called rigid cohomology. (en)
- Inom algebraisk geometri är Monsky–Washnitzerkohomologi en p-adisk kohomologiteori definierad för icke-singulära över kroppar med positiv karakteristik p introducerad av och och ) som motiverades av arbetet av ). Idén är att lyfta varieteten till karaketristik 0 och sedan ta en passlig delalgebra av av ). Konstruktionen förenklades av ). (sv)
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| - Paul (en)
- Gerard (en)
- Bernard (en)
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| - Dwork (en)
- Monsky (en)
- Washnitzer (en)
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| - 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 Paul Monsky and Gerard Washnitzer and , who were motivated by the work of Bernard Dwork. The idea is to lift the variety to characteristic 0, and then take a suitable subalgebra of the algebraic de Rham cohomology of . The construction was simplified by . Its extension to more general varieties is called rigid cohomology. (en)
- Inom algebraisk geometri är Monsky–Washnitzerkohomologi en p-adisk kohomologiteori definierad för icke-singulära över kroppar med positiv karakteristik p introducerad av och och ) som motiverades av arbetet av ). Idén är att lyfta varieteten till karaketristik 0 och sedan ta en passlig delalgebra av av ). Konstruktionen förenklades av ). (sv)
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