English

Relative crystalline representations and weakly admissible modules

Number Theory 2018-10-16 v2

Abstract

Let kk be a perfect field of characteristic p>2p > 2, and let KK be a finite totally ramified extension over W(k)[1p]W(k)[\frac{1}{p}]. Let R0R_0 be an unramified relative base ring over W(k)X1±1,,Xd±1W(k)\langle X_1^{\pm 1}, \ldots, X_d^{\pm 1}\rangle, and let R=R0W(k)OKR = R_0\otimes_{W(k)}\mathcal{O}_K. We define relative BB-pairs and study their relations to weakly admissible R0[1p]R_0[\frac{1}{p}]-modules and Qp\mathbf{Q}_p-representations. As an application, when R=OK[ ⁣[Y] ⁣]R = \mathcal{O}_K[\![Y]\!] with k=kk = \overline{k}, we show that every rank 22 horizontal crystalline representation with Hodge-Tate weights in [0,1][0, 1] whose associated isocrystal over W(k)[1p]W(k)[\frac{1}{p}] is reducible arises from a pp-divisible group over RR. Furthermore, we give an example of a BB-pair which arises from a weakly admissible R0[1p]R_0[\frac{1}{p}]-module but does not arise from a Qp\mathbf{Q}_p-representation.

Keywords

Cite

@article{arxiv.1806.00867,
  title  = {Relative crystalline representations and weakly admissible modules},
  author = {Yong Suk Moon},
  journal= {arXiv preprint arXiv:1806.00867},
  year   = {2018}
}

Comments

Revised to generalize for any ramification

R2 v1 2026-06-23T02:17:32.371Z