Unramified Grothendieck-Serre for simply-connected group schemes satisfying an isotropy condition via unipotent chains

Abstract

We prove a case of the Grothendieck-Serre conjecture: let R be a Noetherian semilocal flat algebra over a Dedekind domain such that all fibers of R are geometrically regular; let G be a simply-connected reductive R-group scheme having a strictly proper parabolic subgroup scheme. Then a G-torsor over R is trivial, provided that it is trivial over the total ring of fractions of R. We also simplify the proof of the conjecture in the quasi-split unramified case. The argument is based on the notion of a unipotent chain of torsors that we introduce. We also prove that if R is a Noetherian normal domain and G is as above, then for any generically trivial torsor over an open subset U of the spectrum of R, there is a closed subset Z of the spectrum of R of codimension at least two such the torsor trivializes over every affine scheme that factors through U-Z.