Let $$$p_1, \ldots, p_n$$$ be a permutation of $$$[1, \ldots, n]$$$.

Let the $$$q$$$-subsequence of $$$p$$$ be a permutation of $$$[1, q]$$$, whose elements are in the same relative order as in $$$p_1, \ldots, p_n$$$. That is, we extract all elements not exceeding $$$q$$$ together from $$$p$$$ in the original order, and they make the $$$q$$$-subsequence of $$$p$$$.

For a given array $$$a$$$, let $$$pre(i)$$$ be the largest value satisfying $$$pre(i) < i$$$ and $$$a_{pre(i)} > a_i$$$. If it does not exist, let $$$pre(i) = -10^{100}$$$. Let $$$nxt(i)$$$ be the smallest value satisfying $$$nxt(i) > i$$$ and $$$a_{nxt(i)} > a_i$$$. If it does not exist, let $$$nxt(i) = 10^{100}$$$.

For each $$$q$$$ such that $$$1 \leq q \leq n$$$, let $$$a_1, \ldots, a_q$$$ be the $$$q$$$-subsequence of $$$p$$$. For each $$$i$$$ such that $$$1 \leq i \leq q$$$, $$$pre(i)$$$ and $$$nxt(i)$$$ will be calculated as defined. Then, you will be given some integer values of $$$x$$$, and for each of them you have to calculate $$$\sum\limits_{i=1}^q \min(nxt(i) - pre(i), x)$$$.