The number of Goldbach representations of an integer

Languasco, Alessandro; Zaccagnini, Alessandro

doi:10.1090/S0002-9939-2011-10957-2

The number of Goldbach representations of an integer
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by Alessandro Languasco and Alessandro Zaccagnini PDF

Proc. Amer. Math. Soc. 140 (2012), 795-804 Request permission

Abstract:

Let $\Lambda$ be the von Mangoldt function and $R(n)\! =\! \sum _{h+k=n}\! \Lambda (h)\Lambda (k)$ be the counting function for the Goldbach numbers. Let $N \geq 2$ and assume that the Riemann Hypothesis holds. We prove that \[ \sum _{n=1}^{N} R(n) = \frac {N^{2}}{2} -2 \sum _{\rho } \frac {N^{\rho + 1}}{\rho (\rho + 1)} + \mathcal {O}(N \log ^{3}N), \] where $\rho =1/2+i\gamma$ runs over the non-trivial zeros of the Riemann zeta-function $\zeta (s)$. This improves a recent result by Bhowmik and Schlage-Puchta.

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