# Sorting 5 elements with minimum element comparison

I have to model the execution plan of sorting a list of 5 elements, in python, using the minimum number of comparisons between elements. Other than that, the complexity is irrelevant.

The result is a list of pairs representing the comparisons needed to sort the list at another time.

I know there's an algorithm that does this in 7 comparisons (between elements, always, not complexity-wise), but I can't find a readable (for me) version.

How can I sort the 5 elements in 7 comparisons, and build an "execution plan" for the sort?

PD: not homework.

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Worst case, best case, average case? –  Joel Cornett Jul 29 '12 at 3:55
Not what you were looking for, but I was curious, so I just checked: on the 120 permutations of range(5), the number of permutations for which the built-in `sorted` uses each number of comparisons are: 4: 2, 6: 5, 7: 33, 8: 56, 9: 24. –  Dougal Jul 29 '12 at 4:01
Just curious, what does Knuth have to do with this? –  Woody Jul 29 '12 at 4:15
Do the descriptions of the optimal algorithm given in the answers to this question suffice? –  DSM Jul 29 '12 at 4:20
@Woody Knuth described an algorithm for this, as I recall –  uʍop ǝpısdn Jul 29 '12 at 5:41

This fits your description of sorting `5 elements in 7 comparisons`:

``````import random

n=5
ran=[int(n*random.random()) for i in xrange(n)]
print ran

def selection_sort(li):
l=li[:]
sl=[]
i=1
while len(l):
lowest=l[0]
for x in l:
if x<lowest:
lowest=x
sl.append(lowest)
l.remove(lowest)
print i
i+=1
return sl

print selection_sort(ran)
``````

This uses a Selection Sort which is NOT the most efficient, but does use very few comparisons.

This can be shortened to:

``````def ss(li):
l=li[:]
sl=[]
while len(l):
sl.append(l.pop(l.index(min(l))))
return sl
``````

In either case, prints something like this:

``````[0, 2, 1, 1, 4]
1
2
3
4
5
[0, 1, 1, 2, 4]
``````

Perl has a lovely module called Algorithm::Networksort that allows you to play with these. The Bose-Nelson algorithm is cited by Knuth for few comparators and you can see it here.

Edit

An insertion sort also works well:

``````def InsertionSort(l):
""" sorts l in place using an insertion sort """
for j in range(1, len(l)):
key = l[j]
i = j - 1
while (i >=0) and (l[i] > key):
l[i+1] = l[i]
i = i - 1

l[i+1] = key
``````
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Well, there are 5!=120 ways how can elements be ordered. Each comparison gives you one bit of information, so you need at least k comparisons, where 2^k >= 120. You can check 2^7 = 128, so the 7 is least number of comparisons you need to perform.

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Beautiful math, but this is not answering my question =/ –  uʍop ǝpısdn Jul 29 '12 at 5:40
So then what is your question? @uwop-episdn –  msw Jul 29 '12 at 14:17
'How can I sort the 5 elements in 7 comparisons, and build an "execution plan" for the sort?'. It was written right there =/ –  uʍop ǝpısdn Jul 31 '12 at 9:30