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Before saying "this has been asked before", or "find an algorithm book", please read on and tell me what part of my reasoning went wrong?

Say you have n intergers, and you divded them into k bins, this will take O(n) time. However, one need to sort each of the k bins, if using quick sort for each bin this is an O((n/k)*log(n/k)) operation, so this step would take O(n*log(n/k)+k). Finally one need to assemble this array, this takes O(n+k), (see this post), so the total operation would be O(n+n*log(n/k)+k). Now, how did this n*log(n/k) disappeared, I could not figure at all. My guess is there is some mathematics going on which eliminates this n*log(n/k). Anyone could help?

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3 Answers 3

Your flaw is assuming that quicksort is used to sort the buckets. Typically this is not the case, and that's how you avoid the (n / k) log(n / k) terms.

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But what else can you used? Some website said you could use recursive bucket, but that would take O(n+k*2) according to my analysis. – John Yang Nov 7 '11 at 17:33
which is O(n+k). – Karoly Horvath Nov 7 '11 at 18:25
Yes, recursive bucket is standard. And O(n + 2k) is O(n + k) (right, if f is bounded by C * (n + 2k) then f is bounded by 2C * (n + k) because 2C * (n + k) bounds C * (2n + 2k) which bounds C * (n + 2k) which bounds f by assumption). – jason Nov 7 '11 at 18:30
@yi_H, sorry I mean O(n+k^2). – John Yang Nov 7 '11 at 19:41

Your assumption:

  • k - the number of buckets - is arbitrary

is wrong.

There are two variants of bucket sort, so it is quite confusing.


The number of buckets is equal to the number of items in the input

See analysis here


The number of buckets is equal to R - the number of possible values for the input integers

See analysis here and here

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There are many different versions of Bucketsort (see Wikipedia). Unsure which one he is thinking of. But you are correct for the variant where one uses n buckets. – Michael Nov 7 '11 at 18:17
Neither A or B is what I had in mind, for B it is called pigeonhole sort according to Wikipedia. A looks to me very inefficient, each bucket has only one items in average? What I had in mind is k<<n, say n=1000, k=10. – John Yang Nov 7 '11 at 19:45
@John Yang: A is good when the input is generated by a random process with uniform distribution. The sorting of each bucket has theta(1), therefore the entire algorithm runs in linear expected time. B is good when k<<n. – Lior Kogan Nov 7 '11 at 20:10
@JohnYang Can you answer my response below? In particular what does the k mean in your algorithm, e.g., that the n numbers are all in the range from 1 - k? If the number n can be from some large set and k is small and independent of n, then you don't get O(n + k). To see this, you could for example take k=2 or k=1. – Michael Nov 8 '11 at 1:54

Your analysis looks good. The term Bucketsort is used for many different algorithms, so depending on which one you looked at its average runtime might be O(n + k) or not.

If I had to guess, you might have looked at a typical variant where one chooses k very large so that n/k will be a constant. In another popular variant even k >> n, so one divides into k/n buckets instead.

If you provide the algorithm in detail and the source which claims this to be in an average of O(n + k) I can revisit my answer.

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n is the number of elements to sort and k is the number of buckets, you could assume the number of elements is evenly distributed, so each buckets have n/k elements. The O(n+k) is from wikipedia. – John Yang Nov 8 '11 at 3:39
If you're referring to wikipedia, you'll see that the number of buckets they use is n in their pseudo-code. If one were to use your algorithm (which appears nowhere on wikipedia), then if one choses k=2 one gets quicksort, which is at least O(n log n) on average. – Michael Nov 9 '11 at 3:30

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