Grigory has $$$n$$$ magic stones, conveniently numbered from $$$1$$$ to $$$n$$$. The charge of the $$$i$$$-th stone is equal to $$$c_i$$$.

Sometimes Grigory gets bored and selects some inner stone (that is, some stone with index $$$i$$$, where $$$2 \le i \le n - 1$$$), and after that synchronizes it with neighboring stones. After that, the chosen stone loses its own charge, but acquires the charges from neighboring stones. In other words, its charge $$$c_i$$$ changes to $$$c_i' = c_{i + 1} + c_{i - 1} - c_i$$$.

Andrew, Grigory's friend, also has $$$n$$$ stones with charges $$$t_i$$$. Grigory is curious, whether there exists a sequence of zero or more synchronization operations, which transforms charges of Grigory's stones into charges of corresponding Andrew's stones, that is, changes $$$c_i$$$ into $$$t_i$$$ for all $$$i$$$?

The first line contains one integer $$$n$$$ ($$$2 \le n \le 10^5$$$) — the number of magic stones.

The second line contains integers $$$c_1, c_2, \ldots, c_n$$$ ($$$0 \le c_i \le 2 \cdot 10^9$$$) — the charges of Grigory's stones.

The second line contains integers $$$t_1, t_2, \ldots, t_n$$$ ($$$0 \le t_i \le 2 \cdot 10^9$$$) — the charges of Andrew's stones.

If there exists a (possibly empty) sequence of synchronization operations, which changes all charges to the required ones, print "Yes".

Otherwise, print "No".

In the first example, we can perform the following synchronizations ($$$1$$$-indexed):

• First, synchronize the third stone $$$[7, 2, \mathbf{4}, 12] \rightarrow [7, 2, \mathbf{10}, 12]$$$.
• Then synchronize the second stone: $$$[7, \mathbf{2}, 10, 12] \rightarrow [7, \mathbf{15}, 10, 12]$$$.

In the second example, any operation with the second stone will not change its charge.