# HashDoS: how can worst case complexity of Hashtable be O(n^2)?

By now many of you must have heard about HashDoS. The researchers who found this, claim in their video that the worst case complexity of Hastable is `O(n^2)`. How can this be?

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possible duplicate of Time complexity of Hash table –  Raymond Chen Dec 30 '11 at 7:41
I do not think this is a duplicate. The question is about O(n^2) which has not been addressed in the previous question. –  Mike Nakis Dec 30 '11 at 7:45
It's not a duplicate, it's simply a case of someone not reading/understanding the material they're asking about. Mike is correct below - it's O(n) for inserting any one element and O(n^2) for inserting a set of n elements (if you're creating collisions). This is exactly what they state and have on their slides. –  Brian Roach Dec 30 '11 at 7:55
It's not an exact duplicate, but the answer also answer this question. If each operation is O(n) and you perform n operations, then the total time is O(n²). –  Raymond Chen Dec 31 '11 at 0:40

@MikeNakis I am sorry that my question didn't make any sense, but anyway you still got my question, but, I could not understand your explanation, sorry, but it seems you are merely restating their statement. Let me explain it verbosely. I am talking about worst case, so it is evident that all the keys generate the same hash. To improve the access time typically the items in a bucket are sorted. So, 'worst case' hash is actually like a sorted array. So, do you mean that in this case it is not possible to employ a sorting algorithm which can sort in `O(n log n)`? –  AppleGrew Dec 30 '11 at 9:53
@MarkNakis Sorry, I too was harsh. Chains in a bucket are usually implemented by linked list, right? If so then inserting n elements should take constant time (adding the elements to the head). So, it is again `O(n)`. I still do not see how we arrive at `O(n^2)`. Can you please point to me to some real code for hastable implementation? –  AppleGrew Dec 30 '11 at 14:20