The first simultaneous sign change and non-vanishing of Hecke eigenvalues of newforms

Abstract

Let f and g be two distinct newforms which are normalized Hecke eigenforms of weights k1, k2 2 and levels N1, N2 1 respectively. Also let af(n) and ag(n) be the n-th Fourier-coefficients of f and g respectively. In this article, we investigate the first sign change of the sequence \af(pα)ag(pα) \pα ∈ , α 2, where p is a prime number. We further study the non-vanishing of the sequence \af(n)ag(n) \n ∈ and derive bounds for first non-vanishing term in this sequence. We also show, using ideas of Kowalski-Robert-Wu and Murty-Murty, that there exists a set of primes S of natural density one such that for any prime p ∈ S, the sequence \af(pn)ag(pm) \n,m ∈ has no zero elements. This improves a recent work of Kumari and Ram Murty. Finally, using -free numbers, we investigate simultaneous non-vanishing of coefficients of m-th symmetric power L-functions of non-CM forms in short intervals.