On a Relation between Euler characteristics of de Rham cohomology and Koszul cohomology of graded local cohomology modules
Abstract
Let K be a field of characteristic zero. Let R = K[X0, X1,…,Xn] be standard graded. Let An+1(K) be the (n + 1)th Weyl algebra over K. Let I be a homogeneous ideal of R and let M = HiI(R) for some i ≥ 0. By a result of Lyubeznik, M is a graded holonomic An +1(K)-module for each i ≥ 0. Let c(∂, M) (c(X, M)) be the Euler characteristics of de Rham cohomology (resp. Koszul cohomology) of M. We prove c(∂, M) = (-1)n+1c(X, M).
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