A Partial Proof of a Conjecture of Dris

Abstract

Euler showed that if an odd perfect number N exists, it must consist of two parts N=qk n2, with q prime, q k 1 4, and gcd(q,n)=1. Dris conjectured that qk < n. We first show that q<n for all odd perfect numbers. Afterwards, we show qk < n holds in many cases.