Abstract
Let $f(n)=\sigma(n)/e^\gamma n\log\log n$, $n=3,4,\ldots$ , where $\sigma$ denotes the sum of divisors function. In 1984 Robin proved that the inequality $f(n)>1$, for all $n\ge 5041$, is equivalent to the Riemann hypothesis. Here we show that the values of $f$ are close to $0$ on a set of asymptotic density $1$. Similarly, an inequality by Rosser and Schoenfeld of 1962, dealing with the Euler totient function $\varphi$, is essential only on "thin" subsets of $\mathbf{N}$.
Citation
Marek Wójtowicz. "Robin's inequality and the Riemann hypothesis." Proc. Japan Acad. Ser. A Math. Sci. 83 (4) 47 - 49, April 2007. https://doi.org/10.3792/pjaa.83.47
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