H-index II¶
Time: O(LogN); Space: O(1); medium
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 1:
Input: citations = [0,1,3,5,6]
Output: 3
Explanation:
[0,1,3,5,6] means the researcher has 5 papers in total and each of them had received 0, 1, 3, 5, 6 citations respectively.
Since the researcher has 3 papers with at least 3 citations each and the remaining two with no more than 3 citations each, her h-index is 3.
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 citations is now guaranteed to be sorted in ascending order.
Could you solve it in logarithmic time complexity?
Hints:
Expected runtime complexity is in O(Log N) and the input is sorted.
1. Binary Search [O(LogN), O(1)]¶
[2]:
class Solution1(object):
"""
Time: O(LogN)
Space: O(1)
"""
def hIndex(self, citations):
"""
:type citations: List[int]
:rtype: int
"""
n = len(citations)
left, right = 0, n - 1
while left <= right:
mid = (left + right) // 2
if citations[mid] >= n - mid:
right = mid - 1
else:
left = mid + 1
return n - left
[4]:
s = Solution1()
citations = [0,1,3,5,6]
assert s.hIndex(citations) == 3