p-adic Eichler-Shimura maps for the modular curve
Abstract
We give a new proof of Faltings's p-adic Eichler-Shimura decomposition of the modular curves via BGG methods and the Hodge-Tate period map. The key property is the relation between the Tate module and the Faltings extension, which was already used in the original proof. Then, we construct overconvergent Eichler-Shimura (ES) maps for the modular curves providing ''the second half'' of the overconvergent ES map of Andreatta-Iovita-Stevens. We use higher Coleman theory on the modular curve developed by Boxer-Pilloni to show that the small slope part of the ES maps interpolates the classical p-adic Eichler-Shimura decompositions. Finally, we prove that the overconvergent ES maps are compatible with Poincar\'e and Serre pairings.
Keywords
Cite
@article{arxiv.2102.13099,
title = {p-adic Eichler-Shimura maps for the modular curve},
author = {Juan Esteban Rodríguez Camargo},
journal= {arXiv preprint arXiv:2102.13099},
year = {2023}
}
Comments
To appear in Compositio Mathematica