Kernel of Arithmetic Jet Spaces
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Since the results here have been superseded by another paper cowritten by the author, this article is available for reference purposes only.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 and a non-zero prime in it along with a uniformizer . In the first part of the paper, we construct -shifted -typical Witt vectors for any algebra of length . They are a generalization of the usual -typical Witt vectors. Along with it we construct a lift of Frobenius, called the lateral Frobenius and show that it satisfies a natural identity with the usual Frobenius map. Now given a group scheme defined over , where is an -algebra with a fixed -derivation on it, one naturally considers the -th arithmetic jet space whose points are the Witt ring valued points of . This leads to a natural projection map of group schemes . Let denote the kernel of . One of our main results imply that for any -formal group scheme over , is isomorphic to . As an application, if is a smooth commutative -formal group scheme of dimension and is of characteristic 0 whose ramification is bounded above by , then our result implies that is a canonical extension of by where is the -formal group scheme endowed with the group law of addition of Witt vectors. Our results also give a geometric characterization of which is the subgroup of points of that reduces to identity under the modulo 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The results of this paper has been superseded by another paper cowritten by the author and Sudip Pandit