The Grade Conjecture and Asymptotic Intersection Multiplicity
Abstract
Given a finitely generated module M over a local ring A of characteristic p with M < ∞, we study the asymptotic intersection multiplicity ∞(M, A/x), where x = (x1, …, xr) is a system of parameters for M. We show that there exists a system of parameters such that ∞ is positive if and only if d-r(M, A) = r, where d = A and r = M. We use this to prove several results relating to the Grade Conjecture, which states that M + M = A for any module M with M < ∞.
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