Local Cohomology and Base Change

Abstract

Let X f S be a morphism of Noetherian schemes, with S reduced. For any closed subscheme Z of X finite over S, let j denote the open immersion X Z X. Koll\'ar asked whether for any coherent sheaf F on X Z and any index r≥ 1, the sheaf f*(Rrj* F) is generically free on S and commutes with base change. We answer this affirmatively, by proving a related statement about local cohomology: Let R be Noetherian algebra over a Noetherian domain A, and let I ⊂ R be an ideal such that R/I is finitely generated as an A-module. Let M be a finitely generated R-module. Then there exists a non-zero g ∈ A such that the local cohomology modules HrI(M) A Ag are free over Ag and for any ring map A→ L factoring through Ag, we have HrI(M) A L HrIAL(MA L) for all r.