Shinju loves permutations very much! Today, she has borrowed a permutation $$$p$$$ from Juju to play with.

The $$$i$$$-th cyclic shift of a permutation $$$p$$$ is a transformation on the permutation such that $$$p = [p_1, p_2, \ldots, p_n] $$$ will now become $$$ p = [p_{n-i+1}, \ldots, p_n, p_1,p_2, \ldots, p_{n-i}]$$$.

Let's define the power of permutation $$$p$$$ as the number of distinct elements in the prefix maximums array $$$b$$$ of the permutation. The prefix maximums array $$$b$$$ is the array of length $$$n$$$ such that $$$b_i = \max(p_1, p_2, \ldots, p_i)$$$. For example, the power of $$$[1, 2, 5, 4, 6, 3]$$$ is $$$4$$$ since $$$b=[1,2,5,5,6,6]$$$ and there are $$$4$$$ distinct elements in $$$b$$$.

Unfortunately, Shinju has lost the permutation $$$p$$$! The only information she remembers is an array $$$c$$$, where $$$c_i$$$ is the power of the $$$(i-1)$$$-th cyclic shift of the permutation $$$p$$$. She's also not confident that she remembers it correctly, so she wants to know if her memory is good enough.

Given the array $$$c$$$, determine if there exists a permutation $$$p$$$ that is consistent with $$$c$$$. You do not have to construct the permutation $$$p$$$.

A permutation 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).