Unramified Grothendieck-Serre for isotropic groups

Abstract

The Grothendieck-Serre conjecture predicts that every generically trivial torsor under a reductive group G over a regular semilocal ring R is trivial. We establish this for unramified R granted that Gad is totally isotropic, that is, has a "maximally transversal" parabolic R-subgroup. We also use purity for the Brauer group to reduce the conjecture for unramified R to simply connected G--a much less direct such reduction of Panin had been a step in solving the equal characteristic case of Grothendieck-Serre. We base the group-theoretic aspects of our arguments on the geometry of the stack BunG, instead of the affine Grassmannian used previously, and we quickly reprove the crucial weak P1-invariance input: for any reductive group H over a semilocal ring A, every H-torsor E on P1A satisfies E|\t = 0\ E|\t = ∞\. For the geometric aspects, we develop reembedding and excision techniques for relative curves with finiteness weakened to quasi-finiteness, thus overcoming a known obstacle in mixed characteristic, and show that every generically trivial torsor over R under a totally isotropic G trivializes over every affine open of Spec(R) Z for some closed Z of codimension 2.

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