de Rham cohomology of H1(f)(R) where V(f) is a smooth hypersurface in Pn

Abstract

Let K be a field of characteristic zero, R = K[X1,…,Xn]. Let An(K) = K<X1,…,Xn, ∂1, …, ∂n> be the nth Weyl algebra over K. We consider the case when R and An(K) is graded by giving Xi = ωi and ∂i = -ωi for i =1,…,n (here ωi are positive integers). Set ω = Σk=1nωk. Let I be a graded ideal in R. By a result due to Lyubeznik the local cohomology modules HiI(R) are holonomic An(K)-modules for each i ≥ 0. In this article we compute the de Rham cohomology modules Hj(∂; H1(f)(R)) for j ≤ n-2 when V(f) is a smooth hypersurface in Pn (equivalently A = R/(f) is an isolated singularity).