Bigraded components of F-finite F-modules

Abstract

Let A be a regular ring containing a field of characteristic p>0 and let R=A[x1,…,xm,y1,…,yn] be standard bigraded over A, i.e., bideg(A)=(0,0), bideg(xi)=(1,0) and bideg(yj)=(0,1) for all i and j. Assume that M=i,j M(i,j) is a bigraded FR-finite, FR-module. We use Lyubeznik's theory of F-finite, F-modules from Lyu-Fmod to study the bigraded components of M. The properties we study include vanishing, rigidity, Bass numbers, associated primes, and injective dimension of the components of M. As an application we show that if (A,m) is regular local ring containing a field of characteristic p>0, R/I is equidimensional, Bproj(R/I) is Cohen-Macaulay and non-empty, then HjI(R)(m,n)=0 for all (m,n)≥ (0,0) and all j>height I.