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

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)(AF) 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 -adic properties of the Fourier coefficients of an Ikeda lift Iφ (of an elliptic modular form φ) on U(n,n)(AQ) proving that they are -adic integers which do not all vanish modulo . Finally we combine these results to show that the condition of being a congruence prime for Iφ is controlled by the -divisibility of a product of special values of the symmetric square L-function of φ. We close the paper by computing an example when our main theorem applies.