For a permutation $$$p$$$ of numbers $$$1$$$ through $$$n$$$, we define a stair array $$$a$$$ as follows: $$$a_i$$$ is length of the longest segment of permutation which contains position $$$i$$$ and is made of consecutive values in sorted order: $$$[x, x+1, \ldots, y-1, y]$$$ or $$$[y, y-1, \ldots, x+1, x]$$$ for some $$$x \leq y$$$. For example, for permutation $$$p = [4, 1, 2, 3, 7, 6, 5]$$$ we have $$$a = [1, 3, 3, 3, 3, 3, 3]$$$.

You are given the stair array $$$a$$$. Your task is to calculate the number of permutations which have stair array equal to $$$a$$$. Since the number can be big, compute it modulo $$$998\,244\,353$$$. Note that this number can be equal to zero.