Colength one deformation rings
Abstract
Let be a finite unramified extension, a continuous representation, and a tame inertial type of dimension . We explicitly determine, under mild regularity conditions on , the potentially crystalline deformation ring in parallel Hodge--Tate weights and inertial type when the \emph{shape} of with respect to has colength at most one. This has application to the modularity of a class of shadow weights in the weight part of Serre's conjecture. Along the way we make unconditional the local-global compatibility results of \cite{PQ} and further study the geometry of moduli spaces of Fontaine--Laffaille representations in terms of colength one weights.
Cite
@article{arxiv.2304.03061,
title = {Colength one deformation rings},
author = {Daniel Le and Bao Le Hung and Stefano Morra and Chol Park and Zicheng Qian},
journal= {arXiv preprint arXiv:2304.03061},
year = {2023}
}
Comments
Major revision: shortened some of the arguments, removed the appendix and fixed a number of typos. Comments welcome!