On the structure theorem of graded components of F-finite, F-modules over certain polynomial ring

Abstract

Let K be a field of characteristic p>0, A=K[[Y]] be a power series ring in one variable and Q(A) be the field of fraction of A. Suppose that R=A[X1,…,Xn] is a standard Nn-graded polynomial ring over A, i.e., deg (A)=0∈ Nn and deg(Xj)=ej∈ Nn. Assume that M=u∈ Zn Mu is a Zn-graded F-finite, F-module over R. In this article we prove that, Mu E(A/YA)a(u) Q(A)b(u) Ac(u) for some finite numbers a(u), b(u), c(u)≥ 0. Let for a subset of U of S=\1, …, n\, define a block to be the set (U)=\u ∈ Zn ui ≥ 0 if i ∈ U and ui ≤ -1 if i U \. Note that U⊂eq SB(U)=Zn. We prove that the sets \a(u) u∈ Zn\, \b(u) u∈ Zn\ and \c(u) u∈ Zn\ are constant on B(U) for each subset U of \1,…,n\. In particular, these results holds for composition of local cohomology modules of the form Hi1I1(Hi2I2(… HirIr(R)…) where I1,…,Ir are Nn-graded ideals of R. This provides a positive characteristic analogue of the results proved in TS-23 by the authors in characteristic zero.