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In algebraic geometry, a cohomological descent is, roughly, a "derived" version of a fully faithful descent in the classical descent theory. This point is made precise by the below: the following are equivalent: in an appropriate setting, given a map a from a simplicial space X to a space S,

• ${\displaystyle a^{*}:D^{+}(S)\to D^{+}(X)}$ is fully faithful.
• The natural transformation ${\displaystyle \operatorname {id} _{D^{+}(S)}\to Ra_{*}\circ a^{*}}$ is an isomorphism.

The map a is then said to be a morphism of cohomological descent.

The treatment in SGA uses a lot of topos theory. Conrad's notes gives a more down-to-earth exposition.

See also

• hypercovering, of which a cohomological descent is a generalization

References

1. Conrad n.d., Lemma 6.8.
2. Conrad n.d., Definition 6.5.

• SGA4 V
• Conrad, Brian (n.d.). "Cohomological descent" (PDF). Stanford University.
• P. Deligne, Théorie des Hodge III, Publ. Math. IHÉS 44 (1975), pp. 6–77.

External links

• http://ncatlab.org/nlab/show/cohomological+descent

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