# An array of length N can contain values 1,2,3 … N^2. Is it possible to sort in O(n) time?

Given an array of length N. It can contain values from ranging from 1 to N^2 (N squared) both inclusive, values are integral. Is it possible to sort this array in O(N) time? If possible how?

Edit: This is not a homework.

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If this is a homework question, please tag as such. –  danben Nov 21 '10 at 14:54
Your values are intergral, I assume? You can do it with integers –  CodesInChaos Nov 21 '10 at 15:01
@CodeInChaos: Yes integral, I added that info in the question, thanks. –  riderchap Nov 21 '10 at 15:09
@danben: I've been told that meta-tags such as homework are deprecated. Of course I can't find the reference now. Perhaps a moderator/superuser could comment..? –  Bob Jarvis Nov 21 '10 at 15:12
@Bob Jarvis - here is a link to Jeff Atwood's take on the issue: meta.stackexchange.com/questions/60422/is-homework-an-exception/… –  danben Nov 21 '10 at 17:19

Write each integer in base N, that is each x can be represented as (x1, x2) with x = 1 + x1 + x2*N. Now you can sort it twice with counting sort, once on x1 and once on x2, resulting in the sorted array.

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What's a 'counting sort'? –  Omnifarious Nov 21 '10 at 15:05
A two phase bucket sort. You first count how many entries a bucket will have, and from that the start index of each bucket(takes O(n)). Then you can inplace swap the entries into each bucket in O(n) too. –  CodesInChaos Nov 21 '10 at 15:07
I think the rest of the world calls this a radix sort. –  Omnifarious Nov 21 '10 at 15:13
-1 because I think this answer is significantly less clear than @svick's answer. –  Omnifarious Nov 21 '10 at 15:18
I've only heard the term "counting sort" used to describe a procedure in which duplicated keys will cause duplicated records to be output. The term "bucket sort" would normally be used to describe a single-pass stable partitioning operation, and "radix sort" to describe multi-pass partitioning. –  supercat May 7 '12 at 22:13

Yes, you can, using radix sort with N buckets and two passes. Basically, you treat the numbers as having 2 digits in base N.

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i am not able to understand `x = 1 + x1 + x2*N` as told in accepted answer . If we represent number in base `N` , `N^2` can be expressed in maximum 2 bits , x1 and x2 then `x = x1 * n^0 + x2 * n^1` = `x1 + x2 * N` . please clarify . –  aseem Jan 25 '14 at 7:49

It is possible to sort any array of integers with a well defined maximum value in `O(n)` time using a radix sort. This is likely the case for any list of integers you encounter. For example if you were sorting a list of arbitrary precision integers it wouldn't be true. But all the C integral types have well-defined fixed ranges.

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