Base change of invariant subrings

Abstract

Let R be a Dedekind domain, G an affine flat R-group scheme, and B a flat R-algebra on which G acts. Let A BG be an R-algebra map. Assume that A is Noetherian. We show that if the induced map K A (K B)K G is an isomorphism for any algebraically closed field K which is an R-algebra, then S A (S B)S G is an isomorphism for any R-algebra S.

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