Keith Billington, Maddie Cheng, Jordan Schettler, Ade Irma Suriajaya
Published 2023-06-15Version 1
In this paper, we prove an unconditional form of Fujii's formula for the average number of Goldbach representations and show that the error in this formula is determined by a general zero-free region of the Riemann zeta-function, and vice versa. In particular, we describe the error in the unconditional formula in terms of the remainder in the Prime Number Theorem which connects the error to zero-free regions of the Riemann zeta-function.
Comments: 22 pages (content in 20 pages), a student project conducted at SJSU under Kyushu University SENTAN-Q
On a smoothed average of the number of Goldbach representations
The average number of Goldbach representations over multiples of $q$
Explicit formulae for averages of Goldbach representations
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