English

Absolute Hodge and $\ell$-adic Monodromy

Algebraic Geometry 2023-08-21 v1 Number Theory

Abstract

Let V\mathbb{V} be a motivic variation of Hodge structure on a KK-variety SS, let H\mathcal{H} be the associated KK-algebraic Hodge bundle, and let σAut(C/K)\sigma \in \textrm{Aut}(\mathbb{C}/K) be an automorphism. The absolute Hodge conjecture predicts that given a Hodge vector vHC,sv \in \mathcal{H}_{\mathbb{C}, s} above sS(C)s \in S(\mathbb{C}) which lies inside Vs\mathbb{V}_{s}, the conjugate vector vσHC,sσv_{\sigma} \in \mathcal{H}_{\mathbb{C}, s_{\sigma}} is Hodge and lies inside Vsσ\mathbb{V}_{s_{\sigma}}. We study this problem in the situation where we have an algebraic subvariety ZSCZ \subset S_{\mathbb{C}} containing ss whose algebraic monodromy group HZ\mathbf{H}_Z fixes vv. Using relationships between HZ\mathbf{H}_Z and HZσ\mathbf{H}_{Z_{\sigma}} coming from the theories of complex and \ell-adic local systems, we establish a criterion that implies the absolute Hodge conjecture for vv subject to a group-theoretic condition on HZ\mathbf{H}_{Z}. We then use our criterion to establish new cases of the absolute Hodge conjecture.

Keywords

Cite

@article{arxiv.2011.10703,
  title  = {Absolute Hodge and $\ell$-adic Monodromy},
  author = {David Urbanik},
  journal= {arXiv preprint arXiv:2011.10703},
  year   = {2023}
}

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R2 v1 2026-06-23T20:24:34.818Z