Fox loves permutations! She came up with the following problem and asked Cat to solve it:

You are given an even positive integer $$$n$$$ and a permutation$$$^\dagger$$$ $$$p$$$ of length $$$n$$$.

The score of another permutation $$$q$$$ of length $$$n$$$ is the number of local maximums in the array $$$a$$$ of length $$$n$$$, where $$$a_i = p_i + q_i$$$ for all $$$i$$$ ($$$1 \le i \le n$$$). In other words, the score of $$$q$$$ is the number of $$$i$$$ such that $$$1 < i < n$$$ (note the strict inequalities), $$$a_{i-1} < a_i$$$, and $$$a_i > a_{i+1}$$$ (once again, note the strict inequalities).

Find the permutation $$$q$$$ that achieves the maximum score for given $$$n$$$ and $$$p$$$. If there exist multiple such permutations, you can pick any of them.

$$$^\dagger$$$ A permutation of length $$$n$$$ is an array consisting of $$$n$$$ distinct integers from $$$1$$$ to $$$n$$$ in arbitrary order. For example, $$$[2,3,1,5,4]$$$ is a permutation, but $$$[1,2,2]$$$ is not a permutation ($$$2$$$ appears twice in the array), and $$$[1,3,4]$$$ is also not a permutation ($$$n=3$$$ but there is $$$4$$$ in the array).