Essential dimension in mixed characteristic
Abstract
Suppose is a finite group and is either a prime number or . For positive, we say that is weakly tame at if has no non-trivial normal -subgroups. By convention we say that every finite group is weakly tame at . Now suppose that is a finite group which is weakly tame at the residue characteristic of a discrete valuation ring . Our main result shows that the essential dimension of over the fraction field of is at least as large as the essential dimension of over the residue field . We also prove a more general statement of this type for a class of \'etale gerbes over . As a corollary, we show that, if is weakly tame at and is any field of characteristic containing the algebraic closure of , then the essential dimension of over is less than or equal to the essential dimension of over any characteristic field. A conjecture of A. Ledet asserts that the essential dimension, , of the cyclic group of order over a field is equal to whenever is a field of characteristic . We show that this conjecture implies that for any finite group which is weakly tame at and contains an element of order . To the best of our knowledge, an unconditional proof of the last inequality is out of the reach of all presently known techniques.
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