Nahid Walji
Published 2014-11-07Version 1
Let \pi be a unitary cuspidal automorphic representation for GL(n) over a number field. We establish upper bounds on the number of Hecke eigenvalues of \pi equal to a fixed complex number. For GL(2), we also determine upper bounds on the number of Hecke eigenvalues with absolute value equal to a fixed number \gamma; in the case \gamma=0, this answers a question of Serre. These bounds are then improved upon by restricting to non-dihedral representations. Finally, we obtain analogous bounds for a family of cuspidal automorphic representations for GL(3).
Comments: 13 pages. To appear in Mathematical Research Letters
On the occurrence of Hecke eigenvalues in sectors
On the distribution of Hecke eigenvalues for cuspidal automorphic representations for GL(2)
On systems of Hecke eigenvalues in cohomology of certain subgroups of GL_n(F)
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