On Even Perfect Numbers II

Hung Viet Chu

On Even Perfect Numbers II

Abstract

Let k>2 be a prime such that 2k-1 is a Mersenne prime. Let n = 2α-1p, where α>1 and p<3· 2α-1-1 is an odd prime. Continuing the work of Cai et al. and Jiang, we prove that n\ |\ σk(n) if and only if n is an even perfect number ≠ 2k-1(2k-1). Furthermore, if n = 2α-1pβ-1 for some β>1, then n\ |\ σ5(n) if and only if n is an even perfect number ≠ 496.

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