On the Hecke Eigenvalues of Maass Forms
Abstract
Let φ denote a primitive Hecke-Maass cusp form for o(N) with the Laplacian eigenvalue λφ=1/4+tφ2. In this work we show that there exists a prime p such that p N, |αp|=|βp| = 1, and p(N(1+|tφ|))c, where α p,\;β p are the Satake parameters of φ 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 N and |αp|=|βp| = 1) is at least 34/35.
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