Prime density results for Hecke eigenvalues of a Siegel cusp form

Abstract

Let F in Sk(Sp(2g, Z)) be a cuspidal Siegel eigenform of genus g with normalized Hecke eigenvalues muF(n). Suppose that the associated automorphic representation piF is locally tempered everywhere. For each c>0 we consider the set of primes p for which |muF(p)| >= c and we provide an explicit upper bound on the density of this set. In the case g=2, we also provide an explicit upper bound on the density of the set of primes p for which muF(p) >= c.