The first simultaneous sign change for Fourier coefficients of Hecke-Maass forms

Abstract

Let f and g be two Hecke-Maass cusp forms of weight zero for SL2( Z) with Laplacian eigenvalues 14+u2 and 14+v2, respectively. Then both have real Fourier coefficients say, λf(n) and λg(n), and we may normalize f and g so that λf(1)=1=λg(1). In this article, we first prove that the sequence \λf(n)λg(n)\n ∈ N has infinitely many sign changes. Then we derive a bound for the first negative coefficient for the same sequence in terms of the Laplacian eigenvalues of f and g.