Small values of the Euler function and the Riemann hypothesis
Abstract
Let be Euler's function, be Euler's constant and Nk be the product of the first k primes. In this article, we consider the function c(n) =(n/(n)-e n) n. Under Riemann's hypothesis, it is proved that c(Nk) is bounded and explicit bounds are given while, if Riemann's hypothesis fails, c(Nk) is not bounded above or below.
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