# O(n) algorithm to find out the element appearing more than n/2 times

I was asked in an interview to give an O(n) algorithm to print an element that appears more than n/2 times in an array, if there is such an element. n is the size of the array. I don't have any clue on how to do this. Can anyone help?

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Can you just use a hash and count the number of elements as you scan through the array? – chrisaycock Dec 21 '10 at 3:34
Not sure. I think there should be a simpler and elegant solution. – devnull Dec 21 '10 at 3:36
Oh. You didn't ask for most elegant, just O(n) – Samuel Dec 21 '10 at 3:39
@Samuel: how is that not implied? You could have done a lot worse ;) – sje397 Dec 21 '10 at 3:41
@sje397 Well it sounded like the OP didn't know how to do it in O(n) or wasn't clear what that meant, I hesitate posting an algorithm on SO when "elagance" or "most efficient" is involved :D – Samuel Dec 21 '10 at 3:59

It's the Boyer's Voting algorithm.

It's also O(1) in space!.

Edit

For those complaining about the site color scheme (like me) ... here is the original paper.

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The colour scheme on that link is horrible. – Anon. Dec 21 '10 at 3:40
Here's some more info: stackoverflow.com/questions/780937/… – chrisaycock Dec 21 '10 at 3:43
Nice read. Took me a minute to find the subtle logic which avoids maintaining independent counts: "..._increment or decrement the counter_ according to whether e is the current candidate..." – user166390 Dec 21 '10 at 3:55
@pst Boyer has several of those subtleties in his works. Look for example his string matching algorithm. A jewel! en.wikipedia.org/wiki/… – Dr. belisarius Dec 21 '10 at 3:58
Thanks! @chrisaycock that link was informative. I was having similar doubt. – devnull Dec 21 '10 at 3:59

In psuedocode:

``````int n = array.length
Hash<elementType,int> hash
foreach element in array
hash[element] += 1
foreach entry in hash
if entry.value > n/2
print entry.key
break
``````
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Wouldn't this be considered O(2n) ? – Eric Fortin Dec 21 '10 at 3:39
O(2n) == O(n) I believe – Samuel Dec 21 '10 at 3:41
@Eric This would be `O(n+m)`. By the way, there is no such thing as `O(2n)` as big-O doesn't use constant coefficients; in such a case it's just `O(n)`. – chrisaycock Dec 21 '10 at 3:41
@chrisaycock Thanks – Eric Fortin Dec 21 '10 at 3:42
@chrisaycock. Let `m` be the number of entries in `hash`, and `n` be the number of elements in `array`. `m <= n` so assuming no hash collisions, this algorithm does indeed take `O(n)` time. (If we allow for hash collisions, it takes `O(n^2)` time worst case.) – Ken Bloom Dec 21 '10 at 3:54

It's also the median value, which takes O(n) to find using the median-of-medians algorithm. In C++ you can do this in one line:

``````std::nth_element(begin, begin + n/2, begin + n)
``````
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Note though that `std::nth_element` is only required to be expected O(n) and so likely does not use the median-of-medians algorithm. The quick-sort like selection tends to be better in practice than m-of-m. – Chris Hopman Dec 21 '10 at 4:37