Syzygies and tensor product of modules
Abstract
We give an application of the New Intersection Theorem and prove the following: let R be a local complete intersection ring of codimension c and let M and N be nonzero finitely generated R-modules. Assume n is a nonnegative integer and that the tensor product MRN is an (n+c)th syzygy of some finitely generated R-module. If TorR>0(M,N)=0, then both M and N are nth syzygies of some finitely generated R-modules.
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