Differential operators, pullbacks, and families of automorphic forms

TL;DR

This paper develops new differential operators for automorphic forms, generalizes Shimura's work, and constructs p-adic families of automorphic forms on unitary groups, with applications to ongoing research in automorphic forms and number theory.

Contribution

It introduces generalized differential operators for automorphic forms on unitary groups and constructs p-adic families, extending previous work and connecting to broader research.

Findings

Constructed differential operators generalizing Shimura's operators.

Built p-adic families of automorphic forms on unitary groups.

Established connections to ongoing research in automorphic forms.

Abstract

This paper has two main parts. First, we construct certain differential operators, which generalize operators studied by G. Shimura. Then, as an application of some of these differential operators, we construct certain p-adic families of automorphic forms. Building on the author's earlier work, these differential operators map automorphic forms on a unitary group of signature (n,n) to (vector-valued) automorphic forms on the product $U^\varphi\times U^{-\varphi}$ of two unitary groups, where $U^\varphi$ denotes the unitary group associated to a Hermitian form $\varphi$ of arbitrary signature on an n-dimensional vector space. These differential operators have both a p-adic and a C-infinity incarnation. In the scalar-weight, C-infinity case, these operators agree with ones studied by Shimura. In the final section of the paper, we also discuss some generalizations to other groups and settings. The results from this paper apply to the author's paper-in-preparation with J. Fintzen, E. Mantovan, and I. Varma and to her ongoing joint project with M. Harris, J. -S. Li, and C. Skinner; they also relate to her recent paper with X. Wan.