The Griffiths bundle is generated by groups
Abstract
First the Griffiths line bundle of a -VHS is generalized to a Griffiths character associated to any triple , where is a connected reductive group over an arbitrary field , is a cocharacter (over ) and is an -representation; the classical bundle studied by Griffiths is recovered by taking , the Mumford-Tate group of , the tautological representation afforded by a very general fiber and pulling back along the period map the line bundle associated to . The more general setting also gives rise to the Griffiths bundle in the analogous situation in characteristic given by a scheme mapping to a stack of -Zips. When is -simple, we show that, up to positive multiples, the Griffiths character (and thus also the Griffiths line bundle) is essentially independent of with central kernel, and up to some identifications is given explicitly by . As an application, we show that the Griffiths line bundle of a projective -scheme is nef.
Cite
@article{arxiv.1811.12916,
title = {The Griffiths bundle is generated by groups},
author = {Wushi Goldring},
journal= {arXiv preprint arXiv:1811.12916},
year = {2019}
}
Comments
Math. Ann., to appear