Sign changes of a product of Dirichlet character and Fourier coefficients of half integral weight modular forms

Abstract

Let f∈ Sk+1/2(N,) be a Hecke eigenform of half integral weight k+1/2\,(k≥ 2) and the real nebentypus = 1 where the Fourier coefficients a(n) are reals. We prove that the sequence \(p)a(tp2)\∈ has infinitely many sign changes for almost all primes p where t is a squarefree integer such that a(t)≠ 0. The same result holds for the sequences of Fourier coefficients \a(tp2(2+1))\∈ and \a(tp4)\∈.