Variants of Lehmer's speculation for newforms

Abstract

In the spirit of Lehmer's unresolved speculation on the nonvanishing of Ramanujan's tau-function, it is natural to ask whether a fixed integer is a value of τ(n) or is a Fourier coefficient af(n) of any given newform f(z). We offer a method, which applies to newforms with integer coefficients and trivial residual mod 2 Galois representation, that answers this question for odd integers. We determine infinitely many spaces for which the primes 3≤ ≤ 37 are not absolute values of coefficients of newforms with integer coefficients. For τ(n) with n>1, we prove that τ(n) ∈ \ 1, 3, 5, 7, 13, 17, -19, 23, 37, 691\, and assuming GRH we show for primes that τ(n) ∈ \ \ : \ 41≤ ≤ 97 \ with\ (5)=-1\ \ -11, -29, -31, -41, -59, -61, -71, -79, -89\. We also obtain sharp lower bounds for the number of prime factors of such newform coefficients. In the weight aspect, for powers of odd primes , we prove that m is not a coefficient of any such newform f with weight 2k>M(,m)=O(m) and even level coprime to , where M(,m) is effectively computable.