English

Witt Differential Operators

Algebraic Geometry 2024-02-20 v2

Abstract

For a smooth scheme XX over a perfect field kk of positive characteristic, we define (for each mZm\in\mathbb{Z}) a sheaf of rings D^W(X)(m)\mathcal{\widehat{D}}_{W(X)}^{(m)} of differential operators (of level mm) over the Witt vectors of XX. If X\mathfrak{X} is a lift of XX to a smooth formal scheme over W(k)W(k), then for m0m\geq0 modules over D^W(X)(m)\mathcal{\widehat{D}}_{W(X)}^{(m)} are closely related to modules over Berthelot's ring D^X(m)\widehat{\mathcal{D}}_{\mathfrak{X}}^{(m)} of differential operators of level mm on X\mathfrak{X}. Our construction therefore gives an description of suitable categories of modules over these algebras, which depends only on the special fibre XX. There is an embedding of the category of crystals on XX (over Wr(k)W_{r}(k)) into modules over D^W(X)(0)/pr\mathcal{\widehat{D}}_{W(X)}^{(0)}/p^{r}; and so we obtain an alternate description of this category as well. For a map φ:XY\varphi:X\to Y we develop the formalism of pullback and pushforward of D^W(X)(m)\mathcal{\widehat{D}}_{W(X)}^{(m)}-modules and show all of the expected properties. When working mod prp^{r}, this includes compatibility with the corresponding formalism for crystals, assuming φ\varphi 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 D\mathcal{D}-module theory) and therefore that the pushforward of (a quite general subcategory of) modules over D^W(X)(0)/pr\mathcal{\widehat{D}}_{W(X)}^{(0)}/p^{r} can be computed via the reduction mod prp^{r} 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.

Keywords

Cite

@article{arxiv.2308.03720,
  title  = {Witt Differential Operators},
  author = {Christopher Dodd},
  journal= {arXiv preprint arXiv:2308.03720},
  year   = {2024}
}
R2 v1 2026-06-28T11:50:05.203Z