On the standard twist of the L-functions of half-integral weight cusp forms

Abstract

The standard twist F(s,α) of L-functions F(s) in the Selberg class has several interesting properties and plays a central role in the Selberg class theory. It is therefore natural to study its finer analytic properties, for example the functional equation. Here we deal with a special case, where F(s) satisfies a functional equation with the same -factor of the L-functions associated with the cusp forms of half-integral weight; for simplicity we present our results directly for such L-functions. We show that the standard twist F(s,α) satisfies a functional equation reflecting s to 1-s, whose shape is not far from a Riemann-type functional equation of degree 2 and may be regarded as a degree 2 analog of the Hurwitz-Lerch functional equation. We also deduce some result on the growth on vertical strips and on the distribution of zeros of F(s,α).