A discrepancy result for Hilbert modular forms

Abstract

Let F be a totally real number field and r=[F :Q]. Let Ak(N,ω) be the space of holomorphic Hilbert cusp forms with respect to K1(N), of weight k=(k1,…,kr) such that kj>2 for all j, and with central Hecke character ω. For integral ideals N and n in F such that ( n, N) = 1, we study the Petersson trace formula for the Hecke operator Tn acting on the space Ak(N,ω). We present asymptotic estimates for the terms of the Petersson formula as k0→∞, where k0=(k1,…,kr). As an application, we obtain a weighted discrepancy bound for the distribution of the eigenvalues of the Hecke operator Tp (for a fixed prime ideal p) acting on the space Ak(N,1), when F has narrow class number 1, and the ideal N is generated by (rational) integers. This generalizes a discrepancy result previously obtained by Jung and Sardari in the context of classical cusp forms.