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775. Global and Local Inversions (Medium)
We have some permutation A of [0, 1, ..., N - 1], where N is the length of A.
The number of (global) inversions is the number of i < j with 0 <= i < j < N and A[i] > A[j].
The number of local inversions is the number of i with 0 <= i < N and A[i] > A[i+1].
Return true if and only if the number of global inversions is equal to the number of local inversions.
Example 1:
Input: A = [1,0,2] Output: true Explanation: There is 1 global inversion, and 1 local inversion.
Example 2:
Input: A = [1,2,0] Output: false Explanation: There are 2 global inversions, and 1 local inversion.
Note:
Awill be a permutation of[0, 1, ..., A.length - 1].Awill have length in range[1, 5000].- The time limit for this problem has been reduced.
Related Topics
Hints
Hint 1
Where can the 0 be placed in an ideal permutation? What about the 1?
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