Maximal parahoric arithmetic transfers, resolutions and modularity
Abstract
For any unramified quadratic extension of -adic local fields , we formulate several arithmetic transfer conjectures at any maximal parahoric level, in the context of Zhang's relative trace formula approach to the arithmetic Gan--Gross--Prasad conjecture. The formulation involves a way to resolve the singularity of relevant moduli spaces via natural stratifications and modify derived fixed points. By a local-global method and double induction, we prove these conjectures for unramified over , including the arithmetic fundamental lemma for . Moreover, we prove new modularity results for arithmetic theta series at parahoric levels via a method of modification over and . Along the way, we study the complex and mod geometry of Shimura varieties and special cycles. We introduce the relative Cayley map and also establish Jacquet--Rallis transfers at maximal parahoric levels.
Cite
@article{arxiv.2112.11994,
title = {Maximal parahoric arithmetic transfers, resolutions and modularity},
author = {Zhiyu Zhang},
journal= {arXiv preprint arXiv:2112.11994},
year = {2024}
}
Comments
106 pages, accepted version, to appear in Duke Mathematical Journal