English

Essential dimension in mixed characteristic

Algebraic Geometry 2018-10-18 v2

Abstract

Suppose GG is a finite group and pp is either a prime number or 00. For pp positive, we say that GG is weakly tame at pp if GG has no non-trivial normal pp-subgroups. By convention we say that every finite group is weakly tame at 00. Now suppose that GG is a finite group which is weakly tame at the residue characteristic of a discrete valuation ring RR. Our main result shows that the essential dimension of GG over the fraction field KK of RR is at least as large as the essential dimension of GG over the residue field kk. We also prove a more general statement of this type for a class of \'etale gerbes over RR. As a corollary, we show that, if GG is weakly tame at pp and kk is any field of characteristic p>0p >0 containing the algebraic closure of Fp\mathbb{F}_p, then the essential dimension of GG over kk is less than or equal to the essential dimension of GG over any characteristic 00 field. A conjecture of A. Ledet asserts that the essential dimension, edk(Z/pnZ)\mathrm{ed}_k(\mathbb{Z}/p^n\mathbb{Z}), of the cyclic group of order pnp^n over a field kk is equal to nn whenever kk is a field of characteristic pp. We show that this conjecture implies that edC(G)n\mathrm{ed}_{\mathbb{C}}(G) \geq n for any finite group GG which is weakly tame at pp and contains an element of order pnp^n. To the best of our knowledge, an unconditional proof of the last inequality is out of the reach of all presently known techniques.

Keywords

Cite

@article{arxiv.1801.02245,
  title  = {Essential dimension in mixed characteristic},
  author = {Patrick Brosnan and Zinovy Reichstein and Angelo Vistoli},
  journal= {arXiv preprint arXiv:1801.02245},
  year   = {2018}
}

Comments

16 pages. Corrected some minor mistakes, improved the exposition, and added some additional examples. To appear in Documenta Mathematica

R2 v1 2026-06-22T23:38:42.827Z