On the Lagarias Inequality and Superabundant Numbers
Abstract
We study the Lagarias inequality, an elementary criterion equivalent to the Riemann Hypothesis. Using a continuous extension of the harmonic numbers, we show that the sequence Bn=Hn+eHn(Hn)n is strictly increasing for n 1. As a consequence, if the Lagarias inequality has counterexamples, then the least counterexample must be a superabundant number; equivalently, it suffices to verify the inequality on the superabundant numbers.
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