What type of study is this?

This is a Quantitative Study study.

October 20, 2025Open Access

The étale fundamental group and F-divided sheaves in characteristic p>0

Key Points

The étale fundamental group influences the structure of F-divided sheaves on smooth projective varieties.
If a morphism induces a surjection on fundamental groups, the pullback functor is fully faithful.
Surjections that induce isomorphisms lead to an equivalence in the functor ${ m Fdiv}(X)$ and ${ m Fdiv}(Y)$.
These findings expand previous results on the triviality of F-divided sheaves for simply connected varieties.

Abstract

We investigate how the étale fundamental group controls local systems in characteristic p, namely F-divided sheaves. In analogy with Grothendieck-Malcev's results for discrete groups, we show that if a morphism f Y X of smooth projective varieties over k=k induces a surjection on the étale fundamental groups, then the pullback functor Fdiv (X) Fdiv (Y) is fully faithful. If f is surjective and the induced map is an isomorphism, then the functor is an equivalence. These results extend the theorem of Esnault-Mehta on the triviality of F-divided sheaves over simply connected varieties.

Read Full Paperexternally

Bookmark

View Full Paper

Cite This Study

Sun et al. (Mon,) studied this question.

synapsesocial.com/papers/68f5fcce8d54a28a75cf1bec https://doi.org/https://doi.org/10.48550/arxiv.2509.24360

Bookmark

View Full Paper