Torsors on the complement of a smooth divisor

Abstract

We complete the proof of the Nisnevich conjecture in equal characteristic: for a smooth algebraic variety X over a field k, a k-smooth divisor D ⊂ X, and a reductive X-group G whose base change GD is totally isotropic, we show that each generically trivial G-torsor on X D trivializes Zariski semilocally on X. In mixed characteristic, we show the same when k is a replaced by a discrete valuation ring O, the divisor D is the closed O-fiber of X, and either G is quasi-split or G is only defined over X D but descends to a quasi-split group over Frac(O) (a Kisin-Pappas type variant). Our arguments combine Gabber-Quillen style presentation lemmas with excision and reembedding d\'evissages to reduce to analyzing generically trivial torsors over a relative affine line. As a byproduct of this analysis, we give a new proof for the Bass-Quillen conjecture for reductive group torsors over AdR in equal characteristic.