On the discrete convolution of the Liouville and M\"obius functions
Abstract
In this article we study some properties of the discrete convolution of Liouville function S(n):=Σm1+m2=nλ(m1)λ(m2), which is a Goldbach-type counting function of representations. In particular, using the general approach introduced in a recent paper CGZ, we will give an explicit formula for weighted averages of S(n) with a general weights f(w) that verify suitable conditions. This formula allows us to obtain interesting information about the Dirichlet and power series of S(n) and the discrete convolution with an arbitrary numbers of factors λ(n).
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