Non-vanishing and sign changes of Hecke eigenvalues for half-integral weight cusp forms

Abstract: In this paper, we consider three problems about signs of the Fourier coefficients of a cusp form $\mathfrak{f}$ with half-integral weight:\begin{itemize}\item[--]The first negative coefficient of the sequence ${\mathfrak{a}_{\mathfrak{f}}(tn^2)}_{n\in \N}$,\item[--]The number of coefficients $\mathfrak{a}_{\mathfrak{f}}(tn^2)$ of same signs,\item[--]Non-vanishing of coefficients $\mathfrak{a}_{\mathfrak{f}}(tn^2)$ in short intervals and in arithmetic progressions,\end{itemize}where $\mathfrak{a}_{\mathfrak{f}}(n)$ is the $n$-th Fourier coefficient of $\mathfrak{f}$ and $t$ is a square-free integersuch that $\mathfrak{a}_{\mathfrak{f}}(t)\not=0$.