Branching rules for principal series representations of unramified U(1,1)

TL;DR

This paper develops explicit branching rules for principal series representations of the unramified unitary group U(1,1) over p-adic fields, revealing a multiplicity-free decomposition and addressing open conjectures.

Contribution

It constructs a large family of irreducible representations of the maximal compact subgroup and describes their role in the branching rules for principal series representations, a novel contribution.

Findings

Branching rules are multiplicity-free and characterized by distinct degrees.

Decomposition provides insights into the structure of principal series upon restriction.

Applications address recent open conjectures in the literature.

Abstract

Let $G$ denote the unramified quasi-split unitary group $\mathbb{U}(1,1)(F)$ over a $p$-adic field $F$ with residual characteristic $p \neq 2$. In this paper, we first construct a large family of irreducible representations of the maximal compact subgroup $\mathcal{K} = \mathbb{U}(1,1)(\mathcal{O}_F)$ of $G$. We then describe the branching rules for all principal series representations of $G$ upon restriction to $\mathcal{K}$ in terms of these representations. The resulting decomposition is multiplicity-free and is characterized by distinct degrees. Finally, we present two important applications of this decomposition that address certain recent open conjectures in the literature. This is the first in a series of two articles in which we provide branching rules for all irreducible smooth representations of the $G$ upon restriction to $\mathcal{K}$.