English

Kernel of Arithmetic Jet Spaces

Algebraic Geometry 2023-01-02 v3 Number Theory

Abstract

Since the results here have been superseded by another paper cowritten by the author, this article is available for reference purposes only. Fix a Dedekind domain O\mathcal{O} and a non-zero prime p\mathfrak{p} in it along with a uniformizer π\pi. In the first part of the paper, we construct mm-shifted π\pi-typical Witt vectors Wmn(B)W_{mn}(B) for any O\mathcal{O} algebra BB of length m+n+1m+n+1. They are a generalization of the usual π\pi-typical Witt vectors. Along with it we construct a lift of Frobenius, called the lateral Frobenius F~:Wmn(B)Wm(n1)(B)\tilde{F}: W_{mn}(B) \rightarrow W_{m(n-1)}(B) and show that it satisfies a natural identity with the usual Frobenius map. Now given a group scheme GG defined over Spec R\mathrm{Spec}~ R, where RR is an O\mathcal{O}-algebra with a fixed π\pi-derivation δ\delta on it, one naturally considers the nn-th arithmetic jet space JnGJ^nG whose points are the Witt ring valued points of GG. This leads to a natural projection map of group schemes u:Jm+nGJmGu: J^{m+n}G \rightarrow J^mG. Let NmnGN^{mn}G denote the kernel of uu. One of our main results imply that for any π\pi-formal group scheme G^\hat{G} over Spf R\mathrm{Spf}~ R, NmnG^N^{mn}\hat{G} is isomorphic to Jn1(Nm1G)J^{n-1}(N^{m1}G). As an application, if G^\hat{G} is a smooth commutative π\pi-formal group scheme of dimension dd and RR is of characteristic 0 whose ramification is bounded above by p2p-2, then our result implies that JnGJ^nG is a canonical extension of G^\hat{G} by (Wn1)d(\mathbb{W}_{n-1})^d where Wn1\mathbb{W}_{n-1} is the π\pi-formal group scheme A^n\hat{\mathbb{A}}^n endowed with the group law of addition of Witt vectors. Our results also give a geometric characterization of G(πn+1R)G(\pi^{n+1}R) which is the subgroup of points of G(R)G(R) that reduces to identity under the modulo πn+1\pi^{n+1} map.

Keywords

Cite

@article{arxiv.2204.11250,
  title  = {Kernel of Arithmetic Jet Spaces},
  author = {Arnab Saha},
  journal= {arXiv preprint arXiv:2204.11250},
  year   = {2023}
}

Comments

The results of this paper has been superseded by another paper cowritten by the author and Sudip Pandit

R2 v1 2026-06-24T10:57:00.696Z