The distribution of number of reverse order pairs in a randomly permuted array

Question

There is an array $a_1,\dotsc,a_n$ whose elements are pairwise distinct. We define a reverse order pair to be an ordered pair $(a_i,a_j)$ such that $i < j$ and $a_i > a_j$. Consider the total number of reverse order pairs $N$.

Assume the array is permuted uniformly and randomly, it is well known that $E[N] = \frac{n(n+1)}{4}$. What is the probability distribution of $N$?

Answer 1

First, a quick note on terminology: the standard term for a "reverse order pair" is an inversion. Knowing this makes it easier to search for the answer:

The generating function for the number of permutations with $k$ inversions is the $q$-factorial $[n]_q!$ as shown e.g. here.