I am working through Concrete Mathematics. I came across the following change in index of summation while going through the number theory chapter.
$\sum_{m|n}^{ } \sum_{k|m}{ } a_{k,m} = \sum_{k|n}^{ } \sum_{l|(n/k)} a_{k,kl}$
If I list out the complete summation mechanically I can verify that both the sides are the same. The Left hand side is (I think) for every divisor $m$ of $n$, you have $k$ running through the divisors of $n$ less or equal to $m$. But I can't find some interpretation of the RHS. So I want to know how the right hand side is rearranging the terms.