Classifying affine line bundles on a compact complex space
Abstract
The classification of affine line bundles on a compact complex space is a difficult problem. We study the affine analogue of the Picard functor and the representability problem for this functor. For a fixed Chern class , we introduce the affine Picard functor which assigns to a complex space the set of families of linearly -framed affine line bundles on with Chern class parameterized by . Our main result states that this functor is representable if and only if the map is constant. If this is the case, the space which represents this functor is a linear space over whose underlying set is , where is a Poincar\'e line bundle normalized at . The main idea idea of the proof is to compare the representability of our functor to the representability of a functor considered by Bingener related to the deformation theory of -cohomology classes. Our arguments show in particular that, for , the converse of Bingener's representability criterion holds.
Cite
@article{arxiv.1804.03623,
title = {Classifying affine line bundles on a compact complex space},
author = {Valentin Plechinger},
journal= {arXiv preprint arXiv:1804.03623},
year = {2018}
}