Results 71 to 80 of about 2,199 (127)
Discovery on Goldbach conjecture
, 2019 Goldbach's famous conjecture has always fascinated eminent mathematicians. In this paper we give a rigorous proof basedon a new formulation, namely, that every even integer has a primo-raduis. Our proof is mainly based on the application ofChebotarev-Artin's theorem, Mertens' formula and the Principle exclusion-inclusion of Moivre.
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Contamination of Aflatoxins Induces Severe Hepatotoxicity Through Multiple Mechanisms. [PDF]
Front Pharmacol, 2020 Hua Z +10 more
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, 2017 We answer the question positively. In fact, we believe to have proved that every even integer $2N\geq3\times10^{6}$ is the sum of two odd distinct primes. Numerical calculations extend this result for $2N$ in the range $8-3\times10^{6}$. So, a fortiori, it is shown that every even integer $2N>2$ is the sum of two primes (Goldbach conjecture).
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Rejoinder: More Limitations of Bayesian Leave-One-Out Cross-Validation. [PDF]
Comput Brain Behav, 2019 Gronau QF, Wagenmakers EJ.
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Mathematician Yitang Zhang: why did I return to China at 70? [PDF]
Natl Sci RevZhao W.
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A Simple Proof for Goldbach’s Conjecture
In this article a proof is proposed for Goldbach's conjecture, both for the strong and the weak versions of the conjecture, using a new method that although simple, it has a certain subtlety that simplifies all the deductions regarding how to demonstrate the proof that Goldbach's conjecture is absolutely correct.
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Proof of the Binary Goldbach Conjecture
In this article the proof of the binary Goldbach conjecture is established ( Any integer greater than one is the mean arithmetic of two positive primes ) . To this end the weak Chen conjecture is proved ( Any even integer greater than One is the difference of two positive primes ) and a " located " algorithm is developed for the construction of two ...
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From Chinese Science Bulletin to Science Bulletin: celebrate the coming 50th birthday. [PDF]
Sci Bull (Beijing), 2015 Jia X, An R, Chen XY.
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