On functors that detect Sn
Abstract
Let A be a Noetherian ring. For each k where 0 ≤ k ≤ A we construct left exact functors Dk on Mod(A). Let Dik be the ith-right derived functor of Dk. Let M be a finitely generated A-module. Under mild conditions on A and M we prove that vanishing of some finitely many Dik(M) is equivalent to M satisfying Sn.
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