Let $\sigma(x)$ denote the sum of the divisors of $x$, and call the ratio $I(x) = \sigma(x)/x$ as the abundancy index of $x$. A number $N$ is called perfect if $\sigma(N)=2N$.
According to this paper, it was B. Hornfeck who proved that different odd perfect numbers, $n_1 = {{p_1}^{i_1}}{m_1}^2 \neq n_2 = {{p_2}^{i_2}}{m_2}^2$ have distinct $m_i$, where $p_1$ and $p_2$ are primes. That is:
Claim: If $n_1 = {{p_1}^{i_1}}{m_1}^2$ and $n_2 = {{p_2}^{i_2}}{m_2}^2$ are odd perfect numbers and $m_1 = m_2$, then $n_1 = n_2$.
Proof of Claim
Let $m_1 = m_2$. Since $n_1 = {{p_1}^{i_1}}{m_1}^2$ and $n_2 = {{p_2}^{i_2}}{m_2}^2$ are odd perfect numbers, we have
$$I(n_1) = I({p_1}^{i_1})I({m_1}^2) = 2$$ $$I(n_2) = I({p_2}^{i_2})I({m_2}^2) = 2$$
Therefore:
$$\frac{2}{I({p_1}^{i_1})} = I({m_1}^2) = I({m_2}^2) = \frac{2}{I({p_2}^{i_2})}.$$
Consequently:
$$I({p_1}^{i_1}) = I({p_2}^{i_2})$$
from which it follows that
$${p_1}^{i_1} = {p_2}^{i_2}$$
since powers of primes are solitary.
We conclude that $n_1 = n_2$.
QED.
My question is: Does anybody here have a reference to B. Hornfeck's paper, where this claim is proved?
Thanks!
The paper cites the book Not Always Buried Deep which cites this paper: