Generically trivial torsors under constant groups
Abstract
We resolve the Grothendieck-Serre question over an arbitrary base field : for a smooth -group scheme and a smooth -variety , we show that every generically trivial -torsor over trivializes Zariski semilocally on . This was known when is reductive or when is perfect, and to settle it in general we uncover a wealth of new arithmetic phenomena over imperfect . We build our arguments on new purity theorems for torsors under pseudo-complete, pseudo-proper, and pseudo-finite -groups, for instance, respectively, under wound unipotent -groups, under pseudo-abelian varieties, and under the kernels of comparison maps that relate pseudo-reductive groups to restrictions of scalars of reductive groups. We then deduce an Auslander-Buchsbaum extension theorem for torsors under quasi-reductive -groups; for instance, we show that torsors over under wound unipotent -groups extend to torsors over . For a quasi-reductive -group , this extension theorem allows us to quickly classify -torsors over by an argument that already simplifies the reductive case and to establish Birkhoff, Cartan, and Iwasawa decompositions for . We combine these new results with deep inputs from recent work on the structure of pseudo-reductive and quasi-reductive -groups to show an unramifiedness statement for the Whitehead group (the unstable -group) of a quasi-reductive -group, and then use it to argue that, for a smooth -group and a semilocal -algebra , every -torsor over trivial at is also trivial at , which is known to imply the Grothendieck--Serre conclusion via geometric arguments. To achieve all this, we develop and heavily use the structure theory of -group schemes locally of finite type.
Cite
@article{arxiv.2505.00505,
title = {Generically trivial torsors under constant groups},
author = {Alexis Bouthier and Kestutis Cesnavicius and Federico Scavia},
journal= {arXiv preprint arXiv:2505.00505},
year = {2025}
}
Comments
67 pages