Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

There is a big file of words which is dynamically changing. We are continuously adding some words into it. How would you keep track of top 10 trending words at each moment?

I found this question in a blog but I couldn't understand the answer. The answer is: hash table + min-heap

I understand why hashtable but not min-heap part, can someone help me?

share|improve this question
2  
You usually want a min-heap to keep track of the highest N answers, because at each stage you have a candidate answer and you want to know if it is better than the worst answer in the min-heap - if it is, remove the worst answer of the top N from the min-heap and insert the candidate. Having the - intuitive - max-heap makes it very easy to pick out the very best answer, but when deciding whether to accept a new candidate answer, this is not what you want. (Just remember that when you extract the top N answers at the end, they will come off with the worst of those N first). –  mcdowella Aug 26 '12 at 19:46

2 Answers 2

up vote 7 down vote accepted

If it's top 10 trending words then you should use a max-heap along with a hash-table.

When a new word is added to the file then:

  • Create a new element x with x.key=word and x.count=1.
  • Add x to the hash-table. O(1).
  • Add x to the max-heap. O(lgn).

When an existing word is added to the file then:

  • Find x in the hash-table. O(1).
  • Update x.count to x.count++.

When there is a need to retrieve the top 10 trending words then:

  • Extract 10 times from the max-heap. 10*O(lgn)=O(10*lgn)=O(lgn).

As you can see, all the needed operations are done in at most O(lgn).

share|improve this answer
4  
you would want to use a min heap: when an existing word that's not in top 10 becomes a top 10, removing the min would be consistent time. –  aw626 Dec 8 '12 at 17:01
1  
"Update x.count to x.count++ in the max-heap" - shouldn't that be O(n)? You have to first find x in the max-heap, but you don't know where it is. Once you find it, incrementing it and bubbling it up is a O(lgn) operation. –  B-Con Nov 10 '13 at 20:13
    
@B-Con: Since max-heap and hash-table point to the same element x then there is no need to find it again in the hash table. I will fix that, thanks. –  Avi Cohen Nov 11 '13 at 7:04
5  
You have to use a MinHeap, not MaxHeap. So, if you have k items in the heap, the peek of the heap is the smallest; and everyone else (k - 1) is larger than the peek. Now, if a new word with count > peek comes in, we want to extract the min (O(logk)) and insert the new item (O(logk)).If new item has count smaller than peek, that means it is smaller than any other item in the heap (as it's a Min Heap). We just discard that word as that will not be a part of top k. –  Amit Jan 2 '14 at 22:10
    
@Amit: You are right. Why not add your solution as another one? –  Avi Cohen Jan 3 '14 at 8:00

If you only want to keep the top 10, using a max-heap is overkill. Keeping the 10 entries in a sorted array will be simpler and faster.

For sorting, just use insertion sort starting from the bottom of the array. You will have to check for the case where the candidate is already on the top ten updating its position if required.

share|improve this answer
1  
if you don't keep the other entries, no new entry will ever make it to the top 10. –  Karoly Horvath Sep 16 '13 at 14:33
    
@KarolyHorvath: obviously you still need the hash table to count the hits per entry. My point is that using a min-heap for managing the top 10 entries is overkill. A simple sorted array would perform better and the implementation would be also quite simpler. Actually, for an incrementally updated top-N (and unless you have massive ties) a sorted array would always perform better than a min-heap. –  salva Sep 17 '13 at 7:53

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.