A family of analogues to the Robin criterion
Abstract
The Robin criterion states that the Riemann hypothesis is equivalent to the inequality σ(n) < eγ n n for all n>5040, where σ(n) is the sum of divisors of n, and γ is the Euler--Mascheroni constant. Define the family of functions \[ σ[k] (n):=Σ[d1,…,dk]=nd1… dk \] where [d1, …, dk] is the least common multiple of d1, …, dk. These functions behave asymptotically like σ(n)k as k∞. We prove the following analogue of the Robin criterion: for any k ≥ 2, the Riemann hypothesis holds if and only if σ[k] (n) < (eγ n n)kζ(k) for all n > 2162160, where ζ is the Riemann zeta function.
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