English

Highly Versal Torsors

Algebraic Geometry 2023-07-14 v4 Rings and Algebras

Abstract

Let GG be a linear algebraic group over an infinite field kk. Loosely speaking, a GG-torsor over kk-variety is said to be versal if it specializes to every GG-torsor over any kk-field. The existence of versal torsors is well-known. We show that there exist GG-torsors that admit even stronger versality properties. For example, for every dNd\in\mathbb{N}, there exists a GG-torsor over a smooth quasi-projective kk-scheme that specializes to every torsor over a quasi-projective kk-scheme after removing some codimension-dd closed subset from the latter. Moreover, such specializations are abundant in a well-defined sense. Similar results hold if we replace kk with an arbitrary base-scheme. In the course of the proof we show that every globally generated rank-nn vector bundle over a dd-dimensional kk-scheme of finite type can be generated by n+dn+d global sections. When GG can be embedded in a group scheme of unipotent upper-triangular matrices, we further show that there exist GG-torsors specializing to every GG-torsor over any affine kk-scheme. We show that the converse holds when chark=0\operatorname{char} k=0. We apply our highly versal torsors to show that, for fixed m,nNm,n\in\mathbb{N}, the symbol length of any degree-mm period-nn Azumaya algebra over any local Z[1n,e2πi/n]\mathbb{Z}[\frac{1}{n},e^{2\pi i/n}]-ring is uniformly bounded. A similar statement holds in the semilocal case, but under mild restrictions on the base ring.

Keywords

Cite

@article{arxiv.2301.09426,
  title  = {Highly Versal Torsors},
  author = {Uriya A. First},
  journal= {arXiv preprint arXiv:2301.09426},
  year   = {2023}
}

Comments

42 pages. Comments are welcome. Changes from last version: Theorem 11.2 improved to show that the (n,m)-symbol length of all local rings is uniformly bounded

R2 v1 2026-06-28T08:17:46.725Z