Zig-zag for Galois Representations
Abstract
The zig-zag conjecture says that the reductions of two-dimensional crystalline representations of the Galois group of of large exceptional weights and half-integral slopes up to vary through an alternating sequence of irreducible and reducible mod representations. We prove this conjecture in smoothly varying families of such representations for . The proof uses a limiting argument due to Chitrao-Ghate-Yasuda to reduce to the case of semi-stable representations of weights at most , and then appeals to the work of Breuil-M\'ezard, Guerberoff-Park and Chitrao-Ghate.
Cite
@article{arxiv.2211.12114,
title = {Zig-zag for Galois Representations},
author = {Eknath Ghate},
journal= {arXiv preprint arXiv:2211.12114},
year = {2023}
}
Comments
Updated version: title changed to reflect that this version contains a proof of the conjecture on the full Galois group not just on the inertia subgroup; also includes a proof for the top two slopes