On Robin's criterion for the Riemann Hypothesis
Abstract
Robin's criterion states that the Riemann Hypothesis (RH) is true if and only if Robin's inequality sumd|nd<egamman loglog n is satisfied for n>=5041, where gamma denotes the Euler(-Mascheroni) constant. We show by elementary methods that if n>=37 does not satisfy Robin's criterion it must be even and is neither squarefree nor squarefull. Using a bound of Rosser and Schoenfeld we show, moreover, that n must be divisible by a fifth power >1. As a consequence we infer that RH holds true if and only if every natural number divisible by a fifth power >1 satisfies Robin's inequality.
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