Given the array nums, for each nums[i] find out how many numbers in the array are smaller than it. That is, for each nums[i] you have to count the number of valid j's such that j != i and nums[j] < nums[i].
Return the answer in an array.
Example 1:
Input: nums = [8,1,2,2,3]
Output: [4,0,1,1,3]
Explanation:
For nums[0]=8 there exist four smaller numbers than it (1, 2, 2 and 3).
For nums[1]=1 does not exist any smaller number than it.
For nums[2]=2 there exist one smaller number than it (1).
For nums[3]=2 there exist one smaller number than it (1).
For nums[4]=3 there exist three smaller numbers than it (1, 2 and 2).
Example 2:
Input: nums = [6,5,4,8]
Output: [2,1,0,3]
Example 3:
Input: nums = [7,7,7,7]
Output: [0,0,0,0]
Constraints:
2 <= nums.length <= 5000 <= nums[i] <= 100
题目大意:给你一个数组nums,对于其中每个元素nums[i],请你统计数组中比它小的所有数字的数目.也就是说,对于每个nums[i]你必须计算出有效的j的数量,其中j满足j != i 且 nums[j] < nums[i]. 以数组形式返回答案.
思路一:暴力法,对于每个nums[i], 统计数组中所有小于nums[i]的个数,时间复杂度$O(n^2)$.
C++代码:
class Solution {
public:
vector<int> smallerNumbersThanCurrent(vector<int>& nums) {
int len = nums.size();
vector<int> cnt(len, );
for (int index = ; index < len; ++index) {
for (int i = ; i < len; ++i) {
if (i != index && nums[i] < nums[index])
cnt[index]++;
}
}
return cnt;
}
};
python3代码:
思路二:由于数组中的数属于[0,100], 可以利用计数排序的方式,先将数组排好序。
C++代码:时间复杂度$O(n)$
class Solution {
public:
vector<int> smallerNumbersThanCurrent(vector<int>& nums) {
vector<int> cnt(, );
for (int i = ; i < nums.size(); ++i) {//计数, cnt[i]此时统计的是数组中数i的个数
cnt[nums[i]]++;
}
for (int i = ; i < ; ++i) {//cnt[i]统计的是数组中小于等于数i的个数
cnt[i] += cnt[i - ];
}
vector<int> ans(nums.size(), );
for (int i = ; i < nums.size(); ++i) {
//如果nums[i] == 0, 说明数组中小于0的个数为0,否则小于nums[i]的个数为cnt[nums[i] - 1];
ans[i] = (nums[i] == ? : cnt[nums[i] - ]);
}
return ans;
}
};
python3代码:
时间复杂度O(nlogn)
class Solution:
def smallerNumbersThanCurrent(self, nums: List[int]) -> List[int]:
indics = {}
for index, num in enumerate(sorted(nums)):
indics.setdefault(num, index)
return [indics[num] for num in nums]
时间复杂度O(n):
class Solution:
def smallerNumbersThanCurrent(self, nums: List[int]) -> List[int]:
count = collections.Counter(nums) for i in range(,):
count[i] += count[i-] return [count[x-] for x in nums]