Existence of special primary decompositions in multigraded modules

Abstract

Let R=n ∈ NtRn be a commutative Noetherian Nt-graded ring, and L = n∈NtLn be a finitely generated Nt-graded R-module. We prove that there exists a positive integer k such that for any n ∈ Nt with Ln ≠ 0, there exists a primary decomposition of the zero submodule On of Ln such that for any P ∈ AssR0(Ln), the P-primary component Q in that primary decomposition contains Pk Ln. We also give an example which shows that not all primary decompositions of On in Ln have this property. As an application of our result, we prove that there exists a fixed positive integer l such that the 0 th local cohomology HI0(Ln) = (0 :Ln Il) for all ideals I of R0 and for all n ∈ Nt.