Finite Schur filtration dimension for modules over an algebra with Schur filtration

Abstract

Let G be GLN or SLN as reductive linear algebraic group over a field k of positive characteristic p. We prove several results that were previously established only when N < 6 or p > 2N. Let G act rationally on a finitely generated commutative k-algebra A. Assume that A as a G-module has a good filtration or a Schur filtration. Let M be a noetherian A-module with compatible G action. Then M has finite good/Schur filtration dimension, so that there are at most finitely many nonzero Hi(G,M). Moreover these Hi(G,M) are noetherian modules over the ring of invariants AG. Our main tool is a resolution involving Schur functors of the ideal of the diagonal in a product of Grassmannians.