On the Descartes-Frenicle-Sorli and Dris Conjectures Regarding Odd Perfect Numbers

Abstract

Dris conjectured in his masters thesis that the inequality qk < n always holds, if N = qkn2 is an odd perfect number with special prime q. In this note, we initially show that either of the two conditions n < qk or σ(q)/n < σ(n)/q holds. This is achieved by first proving that σ(q)/n ≠ σ(n)/qk, where σ(x) is the sum of the divisors of x. Using this analysis, we further show that the condition q < n < qk holds in four out of a total of six cases. Finally, we prove that n < qk, and that this holds unconditionally. This finding disproves both the Dris Conjecture and the Descartes-Frenicle-Sorli Conjecture that k = 1.