Sharp de Rham realization
Algebraic Geometry
2009-09-07 v1 Number Theory
Abstract
We introduce the "sharp" (universal) extension of a 1-motive (with additive factors and torsion) over a field of characteristic zero. We define the "sharp de Rham realization" by passing to the Lie-algebra. Over the complex numbers we then show a (sharp de Rham) comparison theorem in the category of formal Hodge structures. For a free 1-motive along with its Cartier dual we get a canonical connection on their sharp extensions yielding a perfect pairing on sharp realizations. We thus provide "one-dimensional sharp de Rham cohomology" of algebraic varieties.
Cite
@article{arxiv.math/0607115,
title = {Sharp de Rham realization},
author = {L. Barbieri-Viale and A. Bertapelle},
journal= {arXiv preprint arXiv:math/0607115},
year = {2009}
}
Comments
30 pages