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In Algorithm Design Manual, there is such an excise

4-26 Consider the problem of sorting a sequence of n 0’s and 1’s using comparisons. For each comparison of two values x and y, the algorithm learns which of x < y, x = y, or x > y holds.

(a) Give an algorithm to sort in n − 1 comparisons in the worst case. Show that your algorithm is optimal.

(b) Give an algorithm to sort in 2n/3 comparisons in the average case (assuming each of the n inputs is 0 or 1 with equal probability). Show that your algorithm is optimal.

For (a), I think it is fairly easy. I can choose a[n-1] as pivot, then do something like in quicksort partition, scan 0 to n - 2, find the middle point where left side is all 0 and right side is all 1, this take n - 1 comparisons.

But for (b), I can't get a clue. It says "each of the n inputs is 0 or 1 with equal probability", so I guess I can assume the numbers of 0 and 1 equal? But how can I get a result which is related to 1/3? divide the whole array into 3 groups?

Thanks

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2 Answers 2

up vote 11 down vote accepted

"0 or 1 with equal probability" is the condition for "average" case. Other cases may have worse timing.

Hint 1: 2/3 = 1/2 + 1/8 + 1/32 + 1/128 + ...

Hint 2: Consider the sequence as a sequence of pairs and compare the items in each pair. Half will return equal; half will not. Of the half that are unequal you know which item in the pair is 0 and which is 1, so those need no more comparisons.

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thanks. But maybe I am just stupid, could you please give me a further hint? I thought in this way originally too, but just don't know how to arrange those segments of comparisons –  Jackson Tale Apr 1 '12 at 17:56
    
Added second hint. I'm not trying to be coy -- I'm just guessing you'd rather figure as much as possible out for yourself. –  xan Apr 1 '12 at 19:38
    
thanks xan. I understand you. –  Jackson Tale Apr 1 '12 at 21:36
    
Can you please elaborate this a little more. Why do we consider the sequence as sequence of pairs. Also what happens if a pair is equal? We can also have n/2 equal pairs and zero unequal pairs if the array of 0s and 1s is already sorted and is of size n –  Sandy Jan 4 at 21:03
    
@Sandy, looking at pairs turns out to be useful because the values are limited to two values (0 and 1) and so a Greater or Less result tells you exactly what each values is. For pairs that test Equal, they are paired up with other such pairs and the process recurs. On average n/4 pairs will compare Equal and after pairing those up we need n/8 more comparisons, which is the 1/8 above. And so on for further Equal results. With n/2 equal pairs, the second level has n/4 comparisons. That's the worst case -- the problem asks for average case. –  xan Jan 4 at 21:41
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No it means that at any position, you have the same chance (probability) of the input value being 0 or 1. this give you a first clue : your algorithm will be randomized.

The runtime will depend on some random variable, and you need to take the expected value to obtain the average complexity case. Note that in this case, you have to detail during complexity analysis, as they require a precise constant (2/3n rather than simply O(n))

Edit:
Hint. In the sorted array (the one you get at the end), what is only thing which varies, knowing you have only 2 possible elements.

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Could you please give me a more detailed way for how to do it? It is not my school home work, I am just self-learning the book. thanks –  Jackson Tale Apr 1 '12 at 14:51
    
according to your hint: the media of the sorted array? or say, from a position, the value (0) starts to change to 1 –  Jackson Tale Apr 1 '12 at 14:59
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