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

Abstract: Let $f\in S_{k+1/2}(N,\chi)$ be a Hecke eigenform of half integral weight $k+1/2\,(k\geq 2)$ and the real nebentypus $\chi=\pm 1$ where the Fourier coefficients $a(n)$ are reals. We prove that the sequence ${\chi(p^{\nu})a(tp^{2\nu})}_{\nu\in\N}$ has infinitely many sign changes for almost all primes $p$ where $t$ is a squarefree integer such that $a(t)\neq 0$. The same result holds for the sequences of Fourier coefficients ${a(tp^{2(2\nu+1)})}_{\nu\in\N}$ and ${a(tp^{4\nu})}_{\nu\in\N}$.