Vanishing of cohomology over complete intersection rings
Abstract
Let R be a complete intersection ring and let M and N be R-modules. It is shown that the vanishing of ExtiR(M,N) for a certain number of consecutive values of i starting at n forces the complete intersection dimension of M to be at most n-1. We also estimate the complete intersection dimension of the dual of M, in terms of vanishing of the cohomology modules, ExtiR(M,N).
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