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When the array has length of n and 1 <= m <= n^0.5

I think you can use a selection algorithm to find the mth smallest integer(there is a complicated one called BFPRT in http://en.wikipedia.org/wiki/Selection_algorithm that is O(n)) and then use that as a pivot to partition the array to get the first m smallest integers.

But, is there a way to do this using a data structure such as a min-heap? And how can I know if it's O(n)?

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It seems to me that the answer is embedded in your question - according to Wikipedia, min-max heap can be built in O(n) time. And once you have that, it should be very simple to get the m smallest elements. –  Jakub Kaleta Apr 16 '13 at 7:52
See pythons heapq nsmallest, docs.python.org/2/library/heapq.html –  robert king Apr 16 '13 at 8:00

3 Answers 3

up vote 4 down vote accepted

You can create a min-heap in linear time. Then you just need to remove the minimum element m times with cost log(n) for each removal. That's O(n) + m*O(log(n)) which is O(n) + O(sqrt(n)*log(n)) which is O(n).

edit I originally said O(n) + O(sqrt(n)*log(n)) is O(sqrt(n)*log(n)) which is wrong because O(n) is actually o(sqrt(n)*log(n)) which implies it's not O(sqrt(n)*log(n))

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He needs to at least check all the cells in the array once. So linear is the minimum –  AK_ Apr 16 '13 at 7:57
You're right. My answer is completely wrong. Haha –  rliu Apr 16 '13 at 7:57
You edited it. .. –  AK_ Apr 16 '13 at 10:50
Yes because it was wrong. I'll add a note in the answer to reflect that –  rliu Apr 16 '13 at 16:55

Simply use radix sort to sort the array in O(n) time.

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This is true for most practical purposes, but it's worth noting that radix sort depends on the length of the numbers. –  rliu Apr 16 '13 at 8:05
@roliu It certainly does. –  Alexey Frunze Apr 16 '13 at 8:10

Build_Heap(A) method can create min_heap or max_heap from random array in O(n) time , if we creates min_heap then it takes O(1) time to get smallest element

so total time to get smallest element is O(n)+)(1) that is O(n)

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