Restriction functor on cohomology

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Definition

Suppose G1,G2 are groups and A is an abelian group. Suppose φ1:G1Aut(A), φ2:G2Aut(A), and α:G1G2 are homomorphisms such that φ2α=φ1, i.e., the G1-action and G2-action on A are compatible. Then, we get an induced homomorphism between the cohomology groups:

resG1G2:Hφ2*(G2,A)Hφ1*(G1,A)

This homomorphism is termed the restriction homomorphism and the functor that sends the map α:G1G2 to this homomorphism is the restriction functor on cohomology.

Note that the direction of this homomorphism is reverse to the direction of the original homomorphism. The association gives a contravariant functor.

Note that it is sufficient to specify φ2 and α since φ1 is defined in terms of them. In other words, we can define the restriction functor in terms of φ2:G2Aut(A) and α:G1G2.

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