English

Maximal parahoric arithmetic transfers, resolutions and modularity

Number Theory 2024-05-10 v3 Algebraic Geometry Representation Theory

Abstract

For any unramified quadratic extension of pp-adic local fields F/F0F/F_0 (p>2)(p>2), 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 F0F_0 unramified over Qp\mathbb Q_p, including the arithmetic fundamental lemma for p>2p>2. Moreover, we prove new modularity results for arithmetic theta series at parahoric levels via a method of modification over Fq\mathbb F_q and C\mathbb C. Along the way, we study the complex and mod pp geometry of Shimura varieties and special cycles. We introduce the relative Cayley map and also establish Jacquet--Rallis transfers at maximal parahoric levels.

Keywords

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

R2 v1 2026-06-24T08:28:08.753Z