On derived functors of graded local cohomology modules-II

Abstract

Let R=K[X1,…, Xn] where K is a field of characteristic zero, and let An(K) be the nth Weyl algebra over K. We give standard grading on R and An(K). Let I, J be homogeneous ideals of R. Let M = HiI(R) and N = HjJ(R) for some i, j. We show that An(K)(M,N) is concentrated in degree zero for all ≥ 0, i.e., An(K)(M,N)l=0 for l ≠0. This proves a conjecture stated in part I of this paper.