Madeline has an array $$$a$$$ of $$$n$$$ integers. A pair $$$(u, v)$$$ of integers forms an inversion in $$$a$$$ if:

• $$$1 \le u < v \le n$$$.
• $$$a_u > a_v$$$.

Madeline recently found a magical paper, which allows her to write two indices $$$u$$$ and $$$v$$$ and swap the values $$$a_u$$$ and $$$a_v$$$. Being bored, she decided to write a list of pairs $$$(u_i, v_i)$$$ with the following conditions:

• all the pairs in the list are distinct and form an inversion in $$$a$$$.
• all the pairs that form an inversion in $$$a$$$ are in the list.
• Starting from the given array, if you swap the values at indices $$$u_1$$$ and $$$v_1$$$, then the values at indices $$$u_2$$$ and $$$v_2$$$ and so on, then after all pairs are processed, the array $$$a$$$ will be sorted in non-decreasing order.

Construct such a list or determine that no such list exists. If there are multiple possible answers, you may find any of them.