Graded components of local cohomology modules supported on C-monomial ideals

Abstract

Let A be a Dedekind domain of characteristic zero such that its localization at every maximal ideal has mixed characteristic with finite residue field. Let R=A[X1,…, Xn] be a polynomial ring and I=(a1U1, …, ac Uc)⊂eq R an ideal, where aj ∈ A (not necessarily units) and Uj's are monomials in X1, …, Xn. We call such an ideal I as a C-monomial ideal. Consider the standard multigrading on R. We produce a structure theorem for the multigraded components of the local cohomology modules HiI(R) for i ≥ 0. We further analyze the torsion part and the torsion-free part of these components. We show that if A is a PID then each component can be written as a direct sum of its torsion part and torsion-free part. As a consequence, we obtain that their Bass numbers are finite.