Congruence primes for automorphic forms on unitary groups and applications to the arithmetic of Ikeda lifts

TL;DR

This paper establishes a criterion for primes to be congruence primes for automorphic forms on unitary groups, linking it to special values of L-functions, and explores the $ ext{l}$-adic properties of Fourier coefficients of Ikeda lifts, with applications to arithmetic.

Contribution

It provides a new sufficient condition for congruence primes for automorphic forms on unitary groups based on L-value divisibility and studies $ ext{l}$-adic properties of Ikeda lift coefficients.

Findings

A divisibility criterion for congruence primes involving special L-values.

Fourier coefficients of Ikeda lifts are $ ext{l}$-adic integers not all vanishing mod $ ext{l}$.

Congruence primes for Ikeda lifts are controlled by $ ext{l}$-divisibility of symmetric square L-values.

Abstract

In this paper we provide a sufficient condition for a prime to be a congruence prime for an automorphic form $f$ on the unitary group $U(n,n)(A_F)$ for a large class of totally real fields $F$ via a divisibility of a special value of the standard $L$-function associated to $f$. We also study $\ell$-adic properties of the Fourier coefficients of an Ikeda lift $I_{\phi}$ (of an elliptic modular form $\phi$) on $U(n,n)(A_{\mathbf{Q}})$ proving that they are $\ell$-adic integers which do not all vanish modulo $\ell$. Finally we combine these results to show that the condition of $\ell$ being a congruence prime for $I_{\phi}$ is controlled by the $\ell$-divisibility of a product of special values of the symmetric square $L$-function of $\phi$. We close the paper by computing an example when our main theorem applies.