Derived functors and Hilbert polynomials over regular local rings

Abstract

Let (A,m) be a regular local ring of dimension d ≥ 1, I an m-primary ideal. Let N be a non-zero finitely generated A-module. Consider the functions \[ tI(N, n) = Σi = 0 d(TorAi(N, A/In)) \ and\ eI(N, n) = Σi = 0 d(ExtAi(N, A/In)) \] of polynomial type and let their degrees be tI(N) and eI(N). We prove that tI(N) = eI(N) = \ N, d -1 \.

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