Robin inequality for 7-free integers

Abstract

Recall that an integer is t-free iff it is not divisible by pt for some prime p. We give a method to check Robin inequality σ(n) < eγ n n, for t-free integers n and apply it for t=6,7. We introduce t, a generalization of Dedekind function defined for any integer t 2 by t(n):=nΠp | n(1+1/p+...+1/pt-1). If n is t-free then the sum of divisor function σ(n) is t(n). We characterize the champions for x t(x)/x, as primorial numbers. Define the ratio Rt(n):=t(n)n n. We prove that, for all t, there exists an integer n1(t), such that we have Rt(Nn)< eγ for n n1, where Nn=Πk=1npk. Further, by combinatorial arguments, this can be extended to Rt(N) eγ for all N Nn, such that n n1(t). This yields Robin inequality for t=6,\,7. For t varying slowly with N, we also derive Rt(N)< eγ.