Abstract
Let R be a local commutative n-Gorenstein ring. The existence of the Gorenstein projective preenvelopes for finite R-modules is known (it was proved using duality arguments). In the present article, we compute an explicit Gorenstein projective preenvelope and a right Gorenstein projective resolution of a finite R-module. In light of this knowledge, we consider left derived functors , and Gexti(−, −). We prove a balance result for the Tate derived functor . Finally, we get an exact sequence connecting these derived functors.
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