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Algorithm to sort a list L of n positive integer keys which need not to be distinct. Should have complexity of O(n+N) where N = maxL(i) - minL(i)?

I tried to something like merge sort, but that gives me O(nlogn). I am given O(N) extra space so it doesn't have to be O(n) complexity. However, i don't know if my mergesort-like algorithm is allowed to take a multiplicity of log n times. please help?

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If this is homework you should add the homework tag. Also, wikipedia has a page that lists complexity for various sorting algorithms at en.wikipedia.org/wiki/Sorting_algorithm. –  JamieSee Oct 1 '12 at 22:06
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@JamieSee, I believe the homework tag has been deprecated. –  lserni Oct 1 '12 at 22:06
    
Thanks, @Iserni. I was unaware of that. –  JamieSee Oct 1 '12 at 22:09
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3 Answers

up vote 0 down vote accepted

The algorithm you describe seems to be a variant of the "count sort" (I was taught it as "librarian sort", ordinamento del libraio)

This is the pseudocode from Wikipedia:

''' allocate an array Count[0..k] ; initialize each array cell to zero ; THEN '''
for each input item x:
    Count[key(x)] = Count[key(x)] + 1
total = 0
for i = 0, 1, ... k:
    c = Count[i]
    Count[i] = total
    total = total + c

''' allocate an output array Output[0..n-1] ; THEN '''
for each input item x:
    store x in Output[Count[key(x)]]
    Count[key(x)] = Count[key(x)] + 1
return Output

http://en.wikipedia.org/wiki/Counting_sort

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thank you for the great input!, I used something like this –  Kkronic Oct 2 '12 at 3:53
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here is my bucket sort (radix sort) implementation.

def _sort(_list):
    buckets=[0]*len(_list)
    for i in _list:
        i=int(i)
        assert(0<=i<len(_list))
        buckets[i]+=1
    result=[]
    for num,count in enumerate(buckets):
        result.extend([num]*count)
    return result

you would need to change len(_list) to max-min, and then change i=int(i) to i= i - min (and in the final result convert i to i + min

The idea is that we transform every number i to i -min. (now min=0 and max = old_max - min). Now in our array the ith position denotes how many times number i-min occurs. We simply go through the list and increment the appropriate array position. We then go through the array in order and have the sorted list.

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best sorting algorithms (merge sort, quick sort etc.) have O(nlogn) complexity however there are some special cases. (Hint: special case for your problem is that they are all integers)

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Actually, what you say is true for in place sorts. Being integer has little to do with it; all that's asked is that there is a comparison operator. –  lserni Oct 1 '12 at 22:29
    
sorry I didn't understand what you mean. nvm people posted explicit answers anyway.. –  gokcehan Oct 1 '12 at 22:38
    
Oh, I meant that when doing a < b, having integers instead of floats (or strings for that matter) does not make it a "special" case. Having the possibility of using significant (O(N)) extra space, though, does. –  lserni Oct 1 '12 at 22:46
    
well, if they were floats (and by float I mean something like rational numbers) I wouldn't be able to count the numbers in a given range therefore wouldn't be able to index them for bucket sort or count sort. that's how I like to remember but I guess we're talking about the same thing. –  gokcehan Oct 1 '12 at 22:57
    
thanks guys, helped alot! –  Kkronic Oct 2 '12 at 3:52
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