Extreme values of the Dedekind function
Abstract
Let (n):=nΠp | n(1+1p) denote the Dedekind function. Define, for n 3, the ratio R(n):=(n)n n. We prove unconditionally that R(n)< eγ for n 31. Let Nn=2...pn be the primorial of order n. We prove that the statement R(Nn)>eγζ(2) for n 3 is equivalent to the Riemann Hypothesis.
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