English

Classicality of derived Emerton-Gee stack

Number Theory 2025-05-13 v4

Abstract

We construct a derived stack χ\chi of Laurent FF-crystals on (OK)Δ(\mathcal{O}_K)_{\mathbb{\Delta}}, where OK\mathcal{O}_K is the ring of integers of a finite extension KK of Qp\mathcal{Q}_p. We first show that its underlying classical stack clχ^{\rm cl}\chi coincides with the Emerton-Gee stack χEG\chi_{\rm EG}, i.e., the moduli stack of \'etale (ϕ,Γ)(\phi, \Gamma)-modules. Then we prove that this derived stack is classical in the sense that when restricted to truncated animated rings, χ\chi is equivalent to the sheafification of the left Kan extension of χEG\chi_{\rm EG} along the inclusion from the classical commutative rings to animated rings.

Cite

@article{arxiv.2309.05066,
  title  = {Classicality of derived Emerton-Gee stack},
  author = {Yu Min},
  journal= {arXiv preprint arXiv:2309.05066},
  year   = {2025}
}
R2 v1 2026-06-28T12:17:25.271Z