English

Lattices in rigid analytic representations

Number Theory 2025-11-12 v3

Abstract

For a profinite group GG and a rigid analytic space XX, we study when an OX(X)\mathcal O_X(X)-linear representation VV of GG admits a lattice, i.e. an OX(X)\mathcal O_{\mathcal X(\mathcal X)}-linear model for a suitable formal model X\mathcal X of XX in the sense of Berthelot. We give a positive answer, under mild assumptions, when XX is strictly quasi-Stein. As a consequence, we are able to describe explicit open rational subdomains of XX over which VV is constant after reduction modulo a power of pp. We give applications in two different directions. First, we prove explicit results on the reduction modulo powers of pp of sheaves of crystalline and semistable representations of fixed weight. Second, we deduce a result on the pseudorepresentation carried by the Coleman--Mazur eigencurve, which can be made explicit whenever equations for a rational subdomain of the eigencurve are given.

Keywords

Cite

@article{arxiv.2403.20232,
  title  = {Lattices in rigid analytic representations},
  author = {Andrea Conti and Emiliano Torti},
  journal= {arXiv preprint arXiv:2403.20232},
  year   = {2025}
}

Comments

44 pages

R2 v1 2026-06-28T15:38:25.156Z