What are the recent advances in solving the Riemann hypothesis?
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Recent advances in solving the Riemann hypothesis include a new criterion proposed by Solé and Planat in 2011. They stated that the Riemann Hypothesis is true if and only if a certain inequality is satisfied for all primes greater than 3. This inequality involves the Chebyshev function, the Euler-Mascheroni constant, and the Riemann zeta function. Using this result, Antoniades created a new criterion for the Riemann Hypothesis and proved its truth using this criterion .
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| The paper does not provide information about recent advances in solving the Riemann hypothesis. The paper discusses a new criterion for the Riemann Hypothesis and proves its truth using this criterion. | |
| The paper does not provide information about recent advances in solving the Riemann hypothesis. The paper discusses a new criterion for the Riemann Hypothesis and proves its truth using this criterion. | |
| The paper does not provide any recent advances in solving the Riemann hypothesis. | |
| The recent advances in solving the Riemann hypothesis are not mentioned in the provided paper. The paper discusses a new criterion for the Riemann Hypothesis proposed by Patrick Solé and Michel Planat in 2011. | |
| The paper does not provide information about recent advances in solving the Riemann hypothesis. The paper discusses a new criterion for the Riemann Hypothesis and proves its truth using this criterion. |
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