On derived functors of Graded local cohomology modules

Abstract

Let K be a field of characteristic zero and let R=K[X1, …,Xn ], with standard grading. Let m= (X1, …, Xn) and let E be the *injective hull of R/m. Let An(K) be the nth Weyl algebra over K. Let I, J be homogeneous ideals in R. Fix i,j ≥ 0 and set M = HiI(R) and N = HjJ(R) considered as left An(K)-modules. We show the following two results for which no analogous result is known in charactersitc p > 0. enumerate Hlm(R(M, N)) E(n)al, for some al, ≥ 0. For all ≥ 0; the finite dimensional vector space An(K)( M, N) is concentrated in degree -n (here M is the standard right An(K)-module associated to M). enumerate We also conjecture that for all i ≥ 0 the finite dimensional vector space iAn(K)(M, N) is concentrated in degree zero. We give a few examples which support this conjecture.