Amicable Pair with Smallest Common Prime Factor 5/Historical Note

Historical Note on Amicable Pair with Smallest Common Prime Factor 5
In $1986$, reported in his  of $1986$ that "numerous mathematicians" had conjectured that all amicable pairs both of whose elements are odd are multiples of $3$.

This amicable pair, a counterexample, was communicated by letter dated $15$th May $1987$ from to.

The latter published it, with mistakes, in his of $1994$:


 * $5 \cdot 7^2 \cdot 11^2 \cdot 13 \cdot 17 \cdot 19^3 \cdot 23 \cdot 37 \cdot 181 \begin{cases} 101 \cdot 8643 \cdot 1947938229 \\ 365147 \cdot 47303071129 \end{cases}$

repeated the mistakes in his of $1997$.

finally published the corrected version in his of $2004$.

It was for some time believed to be the smallest such amicable pair, but smaller ones have since been discovered.