$D$-modules and finite monodromy
Algebraic Geometry
2016-09-06 v2 Number Theory
Abstract
We investigate an analogue of the Grothendieck -curvature conjecture, where the vanishing of the -curvature is replaced by the stronger condition, that the module with connection mod underlies a -module structure. We show that this weaker conjecture holds in various situations, for example if the underlying vector bundle is finite in the sense of Nori, or if the connection underlies a -variation of Hodge structure. We also show isotriviality assuming a coprimality condition on certain mod Tannakian fundmental groups, which in particular resolves in the projective case a conjecture of Matzat-van der Put. v2: the well known 4.2 has been added to make the note self-contained.
Cite
@article{arxiv.1608.06742,
title = {$D$-modules and finite monodromy},
author = {Hélène Esnault and Mark Kisin},
journal= {arXiv preprint arXiv:1608.06742},
year = {2016}
}
Comments
9 pages