Bounds on depth of tensor products of modules

Abstract

Let R be a local complete intersection ring and let M and N be nonzero finitely generated R-modules. We employ Auslander's transpose in the study of the vanishing of Tor and obtain useful bounds for the depth of the tensor product MRN. An application of our main argument shows that, if M is locally free on the the punctured spectrum of R, then either (MRN)≥ (M)+(N)-(R), or (MRN)≤ (R). Along the way we generalize an important theorem of D. A. Jorgensen and determine the number of consecutive vanishing of iR(M,N) required to ensure the vanishing of all higher iR(M,N).