English

Mixed Characteristic Cyclic Matters

Rings and Algebras 2022-12-08 v1

Abstract

The Artin-Schreier polynomial ZpZaZ^p - Z - a is very well known. Polynomials of this type describe all degree pp (cyclic) Galois extensions over any commutative ring of characteristic pp. Equally attractive is the associated Galois action. If θ\theta is a root then σ(θ)=θ+1\sigma(\theta) = \theta + 1 generates the Galois group. Less well known, but equally general, is the so called "differential crossed product" Azumaya algebra generated by x,yx,y subject to the relation xyyx=1xy - yx = 1. In characteristic pp these algebras are always Azumaya and algebras of this sort generate the pp torsion subgroup of the Brauer group of any commutative ring (of characteristic pp). It is not possible for there to be descriptions this general in mixed characteristic 0,p0,p but we can come close. In Galois theory we define degree pp Galois extensions with Galois action σ(θ)=ρθ+1\sigma(\theta) = \rho\theta + 1, where ρ\rho is a primitive pp root of one. The Azumaya algebra analog is generated by x,yx,y subject to the relations xyρyx=1xy - \rho{y}x = 1. The strength of the above constructions can be codified by lifting results. We get characteristic 00 to characteristic pp surjectivity for degree pp Galois extensions and exponent pp Brauer group elements in quite general circumstances. Obviously we want to get similar results for degree pnp^n cyclic extensions and exponent pnp^n Brauer group elements, and mostly we accomplish this though p=2p = 2 is a special case. We also give results without assumptions about pp roots of one.

Keywords

Cite

@article{arxiv.2212.03713,
  title  = {Mixed Characteristic Cyclic Matters},
  author = {David J. Saltman},
  journal= {arXiv preprint arXiv:2212.03713},
  year   = {2022}
}
R2 v1 2026-06-28T07:24:50.984Z