Given an array of citations sorted in ascending order (each citation is a non-negative integer) of a researcher, write a function to compute the researcher's h-index.
According to the definition of h-index on Wikipedia: "A scientist has index h if h of his/her N papers have at least h citations each, and the other N − h papers have no more than h citations each."
Example:
Input:citations = [0,1,3,5,6]Output: 3 Explanation:[0,1,3,5,6]means the researcher has5papers in total and each of them had received 0, 1, 3, 5, 6citations respectively. Since the researcher has3papers with at least3citations each and the remaining two with no more than3citations each, her h-index is3.
Note:
If there are several possible values for h, the maximum one is taken as the h-index.
Follow up:
- This is a follow up problem to H-Index, where
citationsis now guaranteed to be sorted in ascending order. - Could you solve it in logarithmic time complexity?
public class Solution { public int hIndex(int[] citations) { final int n = citations.length; int begin = 0; int end = citations.length; while (begin < end) { final int mid = begin + (end - begin) / 2; if (citations[mid] < n - mid) { begin = mid + 1; } else { end = mid; } } return n - begin; } }
设数组长度为
n,那么n-i就是引用次数大于等于nums[i]的文章数。如果nums[i]<n-i,说明i是有效的H-Index, 如果一个数是H-Index,那么最大的H-Index一定在它后面(因为是升序的),根据这点就可以进行二分搜索了。