On the Hecke Eigenvalues of Maass Forms
arXiv:1405.4937
Abstract
Let $Ï$ denote a primitive Hecke-Maass cusp form for $Î_o(N)$ with the Laplacian eigenvalue $λ_Ï=1/4+t_Ï^2$. In this work we show that there exists a prime $p$ such that $p\nmid N$, $|α_{p}|=|β_{p}| = 1$, and $p\ll(N(1+|t_Ï|))^c$, where $α_{p},\;β_{p}$ are the Satake parameters of $Ï$ at $p$, and $c$ is an absolute constant with $0<c<1$. In fact, $c$ can be taken as $0.27332$. In addition, we prove that the natural density of such primes $p$ ($p\nmid N$ and $|α_{p}|=|β_{p}| = 1$) is at least $34/35$.
Version 2: typos corrected and a new section on natural density added