This is a hard version of this problem. The differences between the versions are the constraint on $$$m$$$ and $$$r_i < l_{i + 1}$$$ holds for each $$$i$$$ from $$$1$$$ to $$$m - 1$$$ in the easy version. You can make hacks only if both versions of the problem are solved.

Turtle gives you $$$m$$$ intervals $$$[l_1, r_1], [l_2, r_2], \ldots, [l_m, r_m]$$$. He thinks that a permutation $$$p$$$ is interesting if there exists an integer $$$k_i$$$ for every interval ($$$l_i \le k_i < r_i$$$), and if he lets $$$a_i = \max\limits_{j = l_i}^{k_i} p_j, b_i = \min\limits_{j = k_i + 1}^{r_i} p_j$$$ for every integer $$$i$$$ from $$$1$$$ to $$$m$$$, the following condition holds:

$$$$$$\max\limits_{i = 1}^m a_i < \min\limits_{i = 1}^m b_i$$$$$$

Turtle wants you to calculate the maximum number of inversions of all interesting permutations of length $$$n$$$, or tell him if there is no interesting permutation.

An inversion of a permutation $$$p$$$ is a pair of integers $$$(i, j)$$$ ($$$1 \le i < j \le n$$$) such that $$$p_i > p_j$$$.