A note on the Diophantine equation 2ln2 = 1+q+ ·s +qα and application to odd perfect numbers

Abstract

Let N be an odd perfect number. Then, Euler proved that there exist some integers n, α and a prime q such that N = n2qα, q n, and q α 1 4. In this note, we prove that the ratio σ(n2)qα is neither a square nor a square times a single prime unless α = 1. It is a direct consequence of a certain property of the Diophantine equation 2ln2 = 1+q+ ·s +qα, where l denotes one or a prime, whose proof is based on the prime ideal factorization in the quadratic orders Z[1-q] and the primitive solutions of generalized Fermat equations xβ+yβ = 2z2. We give also a slight generalization to odd multiply perfect numbers.