2763. Sum of Imbalance Numbers of All Subarrays
Description
The imbalance number of a 0-indexed integer array arr of length n is defined as the number of indices in sarr = sorted(arr) such that:
0 <= i < n - 1, andsarr[i+1] - sarr[i] > 1
Here, sorted(arr) is the function that returns the sorted version of arr.
Given a 0-indexed integer array nums, return the sum of imbalance numbers of all its subarrays.
A subarray is a contiguous non-empty sequence of elements within an array.
Example 1:
Input: nums = [2,3,1,4] Output: 3 Explanation: There are 3 subarrays with non-zero imbalance numbers: - Subarray [3, 1] with an imbalance number of 1. - Subarray [3, 1, 4] with an imbalance number of 1. - Subarray [1, 4] with an imbalance number of 1. The imbalance number of all other subarrays is 0. Hence, the sum of imbalance numbers of all the subarrays of nums is 3.
Example 2:
Input: nums = [1,3,3,3,5] Output: 8 Explanation: There are 7 subarrays with non-zero imbalance numbers: - Subarray [1, 3] with an imbalance number of 1. - Subarray [1, 3, 3] with an imbalance number of 1. - Subarray [1, 3, 3, 3] with an imbalance number of 1. - Subarray [1, 3, 3, 3, 5] with an imbalance number of 2. - Subarray [3, 3, 3, 5] with an imbalance number of 1. - Subarray [3, 3, 5] with an imbalance number of 1. - Subarray [3, 5] with an imbalance number of 1. The imbalance number of all other subarrays is 0. Hence, the sum of imbalance numbers of all the subarrays of nums is 8.
Constraints:
1 <= nums.length <= 10001 <= nums[i] <= nums.length
Solutions
Solution 1: Enumeration + Ordered Set
We can first enumerate the left endpoint $i$ of the subarray. For each $i$, we enumerate the right endpoint $j$ of the subarray from small to large, and maintain all the elements in the current subarray with an ordered list. We also use a variable $cnt$ to maintain the unbalanced number of the current subarray.
For each number $nums[j]$, we find the first element $nums[k]$ in the ordered list that is greater than or equal to $nums[j]$, and the last element $nums[h]$ that is less than $nums[j]$:
If $nums[k]$ exists, and the difference between $nums[k]$ and $nums[j]$ is more than $1$, the unbalanced number increases by $1$;
If $nums[h]$ exists, and the difference between $nums[j]$ and $nums[h]$ is more than $1$, the unbalanced number increases by $1$;
If both $nums[k]$ and $nums[h]$ exist, then inserting the element $nums[j]$ between $nums[h]$ and $nums[k]$ will reduce the unbalanced number by $1$.
Then, we add the unbalanced number of the current subarray to the answer, and continue the iteration until we finish iterating over all subarrays.
The time complexity is $O(n^2 \times \log n)$ and the space complexity is $O(n)$, where $n$ is the length of the array $nums$.
Python3
class Solution:
def sumImbalanceNumbers(self, nums: List[int]) -> int:
n = len(nums)
ans = 0
for i in range(n):
sl = SortedList()
cnt = 0
for j in range(i, n):
k = sl.bisect_left(nums[j])
h = k - 1
if h >= 0 and nums[j] - sl[h] > 1:
cnt += 1
if k < len(sl) and sl[k] - nums[j] > 1:
cnt += 1
if h >= 0 and k < len(sl) and sl[k] - sl[h] > 1:
cnt -= 1
sl.add(nums[j])
ans += cnt
return ans
Java
class Solution {
public int sumImbalanceNumbers(int[] nums) {
int n = nums.length;
int ans = 0;
for (int i = 0; i < n; ++i) {
TreeMap<Integer, Integer> tm = new TreeMap<>();
int cnt = 0;
for (int j = i; j < n; ++j) {
Integer k = tm.ceilingKey(nums[j]);
if (k != null && k - nums[j] > 1) {
++cnt;
}
Integer h = tm.floorKey(nums[j]);
if (h != null && nums[j] - h > 1) {
++cnt;
}
if (h != null && k != null && k - h > 1) {
--cnt;
}
tm.merge(nums[j], 1, Integer::sum);
ans += cnt;
}
}
return ans;
}
}
C++
class Solution {
public:
int sumImbalanceNumbers(vector<int>& nums) {
int n = nums.size();
int ans = 0;
for (int i = 0; i < n; ++i) {
multiset<int> s;
int cnt = 0;
for (int j = i; j < n; ++j) {
auto it = s.lower_bound(nums[j]);
if (it != s.end() && *it - nums[j] > 1) {
++cnt;
}
if (it != s.begin() && nums[j] - *prev(it) > 1) {
++cnt;
}
if (it != s.end() && it != s.begin() && *it - *prev(it) > 1) {
--cnt;
}
s.insert(nums[j]);
ans += cnt;
}
}
return ans;
}
};