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 f with half-integral weight:itemize[--]The first negative coefficient of the sequence \a\f(tn2)\\n∈ ,[--]The number of coefficients a\f(tn2) of same signs,[--]Non-vanishing of coefficients a\f(tn2) in short intervals and in arithmetic progressions,itemizewhere a\f(n) is the n-th Fourier coefficient of f and t is a square-free integersuch that a\f(t)=0.