Galois structure of homogeneous coordinate rings

Abstract

Suppose G is a finite group acting on a projective scheme X over a commutative Noetherian ring R. We study the RG-modules 0(X,F Ln) when n 0, and F and L are coherent G-sheaves on X such that L is an ample line bundle. We show that the classes of these modules in the Grothendieck group G0(RG) of all finitely generated RG-modules lie in a finitely generated subgroup. Under various hypotheses, we show that there is a finite set of indecomposable RG-modules such that each 0(X,F Ln) is a direct sum of these indecomposables, with multiplicites given by generalized Hilbert polynomials for n >> 0.

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