The de Rham functor for logarithmic D-modules
Algebraic Geometry
2020-09-29 v3
Abstract
In the first part we deepen the six-functor theory of (holonomic) logarithmic D-modules, in particular with respect to duality and pushforward along projective morphisms. Then, inspired by work of Ogus, we define a logarithmic analogue of the de Rham functor, sending logarithmic D-modules to certain graded sheaves on the so-called Kato-Nakayama space. For holonomic modules we show that the associated sheaves have finitely generated stalks and that the de Rham functor intertwines duality for D-modules with a version of Poincar\'e-Verdier duality on the Kato-Nakayama space. Finally, we explain how the grading on the Kato-Nakayama space is related to the classical Kashiwara-Malgrange V-filtration for holonomic D-modules.
Keywords
Cite
@article{arxiv.1904.07918,
title = {The de Rham functor for logarithmic D-modules},
author = {Clemens Koppensteiner},
journal= {arXiv preprint arXiv:1904.07918},
year = {2020}
}
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37 pages