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This is an interview question: Given the 1.14 billion population of India,what is the most effective/efficient sorting algorithm that can be used to sort them by their heights?(Heights data is available to you).

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Uhm, quicksort? –  cdhowie Nov 21 '10 at 2:49
    
quick sort would be fine if they can all be held in memory at once. And out of memory sort will be required. –  winwaed Nov 21 '10 at 2:53
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Why will an out of memory sort be required? The question doesn't state hardware requirements, so why can't you simply use hardware that has memory for 1.14 billion entries? –  Slartibartfast Nov 21 '10 at 2:57
    
The quicksort algorithm can be used on an out-of-memory set. Common implementations might not be able to, but there's no reason the algorithm could not work with e.g. mmapped memory. –  cdhowie Nov 21 '10 at 3:09
    
There are generally so many better alternatives to quicksort though... just because it has the trendy name :-/ –  user166390 Nov 21 '10 at 3:30

4 Answers 4

O(n):

If heights can be rounded to nearest mm, then you can compute a histogram of heights and print out the counts in each histogram bucket in order. The expected RAM required is only a few KB for about 2000 32-bit ints.

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As the range of possible heights is fairly small, I recommend:

  1. Express all the heights in millimeters.
  2. Make one pass through the data calculating the min and max heights.
  3. Allocate bins for very height between the min and max.
  4. Make a second pass through the data adding the people to the appropriate bins.

That's two passes through the dataset, plus the bin allocations. O(n).

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There is no need in first iteration, I garantee that the values will be between 0 and 3000mm. –  ruslik Nov 21 '10 at 3:25
    
Step 2 is hardly necessary. A little over 2700 bins is enough for 0 to 9 feet in millimeters. –  Blastfurnace Nov 21 '10 at 3:26
    
And in conclusion, you can skip both of them :) –  ruslik Nov 21 '10 at 3:30
    
On time and under budget, bonuses for everyone. –  Blastfurnace Nov 21 '10 at 3:34
    
i agree that determining the correct number of bins is unnecessary, but it only affects the constant factors of the asymptotic time. –  jtdubs Nov 21 '10 at 3:36

My guess is that the interviewer assumes that the number of different heights is significantly smaller than the number of people, which means that a counting sort would be appropriate, which has a worst-case step complexity of Θ(n+k), where n is the number of people and k is the number of heights.

Because counting sort is not a comparison sort, the typical Ω(n×log n) lower bound does not apply, which is probably what the interviewer was really getting at.

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Another linear time option for bounded numeric data is radix sort, which is just a specialized numeric version of bin sorting.

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