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I am reading introduction to algorithms 3rd edition and i ran into the following: Suppose that we are given n integers in the range 0 to k and we want to find out how many of these integers are in the range [a,b] for given integers a and b. It has the brute solution, but then it says that by a preprocessing phase on the input, this query can be completed in Θ(1) time, and this proprocessing phase takes O(n+k) time. I am thinking about sorting the integers, but sorting at least takes O(nlogn) time, which exceeds O(n+k). What can be done for the preprocessing phase? Thanks

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Use Hash Table. It will be O(1). –  Thanakron Tandavas Mar 15 '13 at 10:07
    
which author of the algorithms book? when citing a book, state the author. –  AlexWien Mar 15 '13 at 10:12
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up vote 4 down vote accepted

Since the numbers are in range [0,k] you can use counting sort to sort them in O(n+k) time.

Once you have the counts, you can take the prefix sums of that count array, which will tell you the number of numbers in the range [0, a]. O(k) time.

Using that you can answer queries for [a,b] by taking the appropriate difference, in O(1) time.

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Why counting sort? Just count them.. –  harold Mar 15 '13 at 10:03
    
Thanks, but did not understand what you mean by "we can use counting to sort them" –  bigO Mar 15 '13 at 10:04
    
@bigO: Count how many zeroes are there, how many ones are there etc. You maintain a counts[0...k] array (initialized to 0). Now each time you get the number j, you increment counts[j]. –  Knoothe Mar 15 '13 at 10:14
    
looks to be the desired solution –  AlexWien Mar 15 '13 at 10:15
    
@harold: I only mentioned sorting because bigO was thinking in those terms. I thought he might be familar with counting sort and would immediately get the answer... –  Knoothe Mar 15 '13 at 10:15
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