Oscillations of coefficients of Dirichlet series attached to automorphic forms

Abstract

For m 2, let π be an irreducible cuspidal automorphic representation of GLm(AQ) with unitary central character. Let aπ(n) be the nth coefficient of the L-function attached to π. Goldfeld and Sengupta have recently obtained a bound for Σn x aπ(n) as x → ∞. For m 3 and π not a symmetric power of a GL2(AQ)-cuspidal automorphic representation with not all finite primes unramified for π, their bound is better than all previous bounds. In this paper, we further improve the bound of Golfeld and Sengupta. We also prove a quantitative result for the number of sign changes of the coefficients of certain automorphic L-functions, provided the coefficients are real numbers.