A central limit theorem for Hilbert modular forms

Abstract

For a prime ideal p in a totally real number field L with the adele ring A, we study the distribution of angles θπ(p) coming from Satake parameters corresponding to unramified πp where πp comes from a global π ranging over a certain finite set k(n) of cuspidal automorphic representations of GL2(A) with trivial central character. For such a representation π, it is known that the angles θπ(p) follow the Sato-Tate distribution. Fixing an interval I⊂eq [0,π], we prove a central limit theorem for the number of angles θπ(p) that lie in I, as N(p)∞. The result assumes n to be a squarefree integral ideal, and that the components in the weight vector k grow suitably fast as a function of x.

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