Equivalence between the Functional Equation and Vorono\"-type summation identities for a class of L-Functions

Abstract

To date, the best methods for estimating the growth of mean values of arithmetic functions rely on the Vorono\" summation formula. By noticing a general pattern in the proof of his summation formula, Vorono\" postulated that analogous summation formulas for Σ a(n)f(n) can be obtained with ``nice" test functions f(n), provided a(n) is an ``arithmetic function". These arithmetic functions a(n) are called so because they are expected to appear as coefficients of some L-functions satisfying certain properties. It has been well-known that the functional equation for a general L-function can be used to derive a Vorono\"-type summation identity for that L-function. In this article, we show that such a Vorono\"-type summation identity in fact endows the L-function with some structural properties, yielding in particular the functional equation. We do this by considering Dirichlet series satisfying functional equations involving multiple Gamma factors and show that a given arithmetic function appears as a coefficient of such a Dirichlet series if and only if it satisfies the aforementioned summation formulas.