On Robin's inequality
Abstract
Let σ(n) denotes the sum of divisors function of a positive integer n. Robin proved that the Riemann hypothesis is true if and only if the inequality σ(n) < eγn n holds for every positive integer n ≥ 5041, where γ is the Euler-Mascheroni constant. In this paper we establish a new family of integers for which Robin's inequality σ(n) < eγn n hold. Further, we establish a new unconditional upper bound for the sum of divisors function. For this purpose, we use an approximation for Chebyshev's -function and for some product defined over prime numbers.
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