Witt Differential Operators
Abstract
For a smooth scheme over a perfect field of positive characteristic, we define (for each ) a sheaf of rings of differential operators (of level ) over the Witt vectors of . If is a lift of to a smooth formal scheme over , then for modules over are closely related to modules over Berthelot's ring of differential operators of level on . Our construction therefore gives an description of suitable categories of modules over these algebras, which depends only on the special fibre . There is an embedding of the category of crystals on (over ) into modules over ; and so we obtain an alternate description of this category as well. For a map we develop the formalism of pullback and pushforward of -modules and show all of the expected properties. When working mod , this includes compatibility with the corresponding formalism for crystals, assuming is smooth. In this case we also show that there is a ``relative de Rham Witt resolution'' (analogous to the usual relative de Rham resolution in -module theory) and therefore that the pushforward of (a quite general subcategory of) modules over can be computed via the reduction mod of Langer-Zink's relative de Rham Witt complex. Finally we explain a generalization of Bloch's theorem relating integrable de Rham-Witt connections to crystals.
Cite
@article{arxiv.2308.03720,
title = {Witt Differential Operators},
author = {Christopher Dodd},
journal= {arXiv preprint arXiv:2308.03720},
year = {2024}
}