Derived functors and Hilbert polynomials over hypersurface rings-II

Abstract

Let (A,m) be a hypersurface local ring of dimension d ≥ 1, N a perfect A-module and let I be an ideal in A with (N/IN) finite. We show that there is a integer rI ≥ -1 (depending only on I and N) such that if M is any non-free maximal \ (= MCM) A-module the functions n → (TorA1(M, N/In+1N)), n → (Ext1A(M, N/In+1N)) and n → (Extd+1(N/In+1N, M)) (which are all of polynomial type) has degree rI. Surprisingly a key ingredient is the classification of thick subcategories of the stable category of MCM A-modules (obtained by Takahashi, see [6.6]T).