H-Index
LeetCode 274 | Difficulty: Mediumβ
MediumProblem Descriptionβ
Given an array of integers citations where citations[i] is the number of citations a researcher received for their i^th paper, return the researcher's h-index.
According to the definition of h-index on Wikipedia: The h-index is defined as the maximum value of h such that the given researcher has published at least h papers that have each been cited at least h times.
Example 1:
Input: citations = [3,0,6,1,5]
Output: 3
Explanation: [3,0,6,1,5] means the researcher has 5 papers in total and each of them had received 3, 0, 6, 1, 5 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, their h-index is 3.
Example 2:
Input: citations = [1,3,1]
Output: 1
Constraints:
- `n == citations.length`
- `1 <= n <= 5000`
- `0 <= citations[i] <= 1000`
Topics: Array, Sorting, Counting Sort
Approachβ
Sortingβ
Sort the input to bring related elements together or enable binary search. Consider: does sorting preserve the answer? What property does sorting give us?
Grouping, finding closest pairs, interval problems, enabling two-pointer or binary search.
Solutionsβ
Solution 1: C# (Best: 147 ms)β
| Metric | Value |
|---|---|
| Runtime | 147 ms |
| Memory | 35.9 MB |
| Date | 2022-01-17 |
public class Solution {
public int HIndex(int[] citations) {
int n = citations.Length;
int[] cited = new int[n+1];
foreach (var c in citations)
{
if(c>n)
{
cited[n]++;
}
else
{
cited[c]++;
}
}
int total = 0;
for (int i = n; i >= 0; i--)
{
total += cited[i];
if(total >= i)
{
return i;
}
}
return 0;
}
}
Complexity Analysisβ
| Approach | Time | Space |
|---|---|---|
| Sort + Process | $O(n log n)$ | $O(1) to O(n)$ |
Interview Tipsβ
- Discuss the brute force approach first, then optimize. Explain your thought process.
- LeetCode provides 3 hint(s) for this problem β try solving without them first.
π‘ Hints
Hint 1: An easy approach is to sort the array first.
Hint 2: What are the possible values of h-index?
Hint 3: A faster approach is to use extra space.