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There are several colors of balls. For one specific color, there are more than half of the balls with this color(>n/2). How can I find this color taking only O(n) running time?

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closed as not a real question by Tim Post Oct 10 '12 at 3:46

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Why don't you just count and deduce result after n? Its O(n). –  noMAD Oct 9 '12 at 16:29
    
By that means, it will take O(n^2) times. You have to compare the ball in your hand with the ball in the holes one by one. –  Miles Oct 9 '12 at 16:29
    
No no, every time you pick a ball, just increment the count of that color. In the end, check which color is the greatest. You can also improvise on this by comparing on the fly :) O(n) since you traverse the array only once. Look up treeMap too, OR Red, Black Trees –  noMAD Oct 9 '12 at 16:30

2 Answers 2

up vote 4 down vote accepted

You can use Boyer-Moore majority algorithm

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This is what I want!!! –  Miles Oct 9 '12 at 16:50
    
+1 This one is clearly the best! And it's a very nice algorithm, too :) –  dasblinkenlight Oct 9 '12 at 16:51
    
@dasblinkenlight: Isn't this almost what you said ? I don't see any big difference. –  noMAD Oct 9 '12 at 16:51
    
@noMAD Well, Boyer-Moore is by far easier to code, much easier to understand, and although it's not asymptotically faster, it will probably have a much smaller constant in front of N. –  dasblinkenlight Oct 9 '12 at 16:54
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@Joost Yes, I'm sure that algo does work. Concerning your example - there are no majority element in this string –  MBo Oct 10 '12 at 3:43

Find the color of each ball and tally it up. This doesn't seem to be a sorting at all if you only want to find the most frequent. Just count the number of balls with each color. You could use a hashtable, key is the color and just iterate the spot. Also keep track of the colors.

Edit: After reading this again, I realized that it did not answer the question.

A) You could just do the tracking at the end by iterating through every available color (assuming you were making that list of colors), as there will be less than n comparisons, it will in the worse case be O(n).

B) While you are tallying the ball count up, keep track of the largest count. Whenever that gets beat, replace it with the current color with the highest count. You probably want to keep track of the color along with the highest number. This way you will do it on a comparison on every run. This again will be O(n) but will have more comparisons.

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The point is, when the number of colors is (n/2-1), it will take O(n^2) times to count the number of balls with each color, because you have to scan all the color to compare. –  Miles Oct 9 '12 at 16:35
    
No it doesn't. Run through your list ONCE and increment counters. Running time is O(N) –  im so confused Oct 9 '12 at 16:40
    
@Mile let n be the number of comparisons. Tallying up does not count as an action. There are n comparisons. O(n). Or if you want to count tallying up and comparisons, it will be O(2*n) which is still O(n). –  user829323 Oct 9 '12 at 16:43

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