English

The Griffiths bundle is generated by groups

Number Theory 2019-08-23 v3 Algebraic Geometry Representation Theory

Abstract

First the Griffiths line bundle of a Q\mathbf Q-VHS V\mathscr V is generalized to a Griffiths character grif(G,μ,r){\rm grif}(\mathbf G, \mu,r) associated to any triple (G,μ,r)(\mathbf G, \mu, r), where G\mathbf G is a connected reductive group over an arbitrary field FF, μX(G)\mu \in X_*(\mathbf G) is a cocharacter (over F\overline{F}) and r:GGL(V)r:\mathbf G \to GL(V) is an FF-representation; the classical bundle studied by Griffiths is recovered by taking F=QF=\mathbf Q, G\mathbf G the Mumford-Tate group of V\mathscr V, r:GGL(V)r:\mathbf G \to GL(V) the tautological representation afforded by a very general fiber and pulling back along the period map the line bundle associated to grif(G,μ,r){\rm grif}(\mathbf G, \mu, r). The more general setting also gives rise to the Griffiths bundle in the analogous situation in characteristic pp given by a scheme mapping to a stack of G\mathbf G-Zips. When G\mathbf G is FF-simple, we show that, up to positive multiples, the Griffiths character grif(G,μ,r){\rm grif}(\mathbf G,\mu,r) (and thus also the Griffiths line bundle) is essentially independent of rr with central kernel, and up to some identifications is given explicitly by μ-\mu. As an application, we show that the Griffiths line bundle of a projective GZipμ\mathbf G{\rm -Zip}^{\mu}-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

R2 v1 2026-06-23T06:27:19.653Z