A few years ago I first read about the marvelous Euler identity:

$\sum_{n\in\mathbb{N}}p(n)z^n=\prod_{k\geq1}\frac{1}{1-z^k}$,

where $p(n)$ is the number of partitions of $n$ ($p(0)=1$ by convention) and some of its beautiful consequences (like the pentagonal number theorem). Taking log of both sides of Euler identity and differentiating, the following nice recursive formula magically appears:

$np(n)=\sum_{k=0}^{n-1}p(k)\sigma(n-k)$,

where $\sigma(n)$ denotes the sum of the divisors of $n$. After some googling I found this identity quoted in a few places, but always without any reference. Since I am quite ignorant about the theory of partitions and related matters, I would like very much to know:

1. Who discovered this identity? Does it have a name?

and the much more interesting:

2. Is there a proof without generating functions?

Thank you!