(Co)homology of Γ-groups and Γ-homological algebra (2006.02083v3)

Abstract: This is a further investigation of our approach to group actions in homological algebra in the settings of homology of {\Gamma}-simplicial groups, particularly of {\Gamma}-equivariant homology and cohomology of {\Gamma}-groups. This approach could be called {\Gamma}-homological algebra. The abstract kernel of non-abelian extensions of groups, its relation with the obstruction to the existence of non-abelian extensions and with the second group cohomology are extended to the case of non-abelian {\Gamma}-extensions of {\Gamma}-groups. We compute the rational {\Gamma}-equivariant (co)homology groups of finite cyclic {\Gamma}-groups. The isomorphism of the group of n-fold {\Gamma}-equivariant extensions of a {\Gamma}-group G by a G o {\Gamma}-module A with the (n+1)th {\Gamma}-equivariant group cohomology of G with coefficients in A is proven.We define the {\Gamma}-equivariant Hochschild homology as the homology of the {\Gamma}- Hochschild complex involving the cyclic homology when the basic ring contains rational numbers and generalizing the {\Gamma}equivariant(co)homology of {\Gamma}-groups when the action of the group {\Gamma} on the Hochschild complex is induced by its action on the basic ring. Important properties of the {\Gamma}-equivariant Hochschild homology related to Kahler differentials, Morita equivalence and derived functors are established. Group (co)homology and {\Gamma}-equivariant group (co)homology of crossed {\Gamma}-modules are introduced and investigated by using relevant derived functors Finally, applications to algebraic K-theory, Galois theory of commutative rings and cohomological dimension of groups are given.