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I can find the median with 12 comparisons. But I want to know the minimum number of comparisons and how to do it.

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I'd like to see your implementation - I can't seem to do it in fewer than 18 operations. – Paul R Nov 11 '10 at 12:23
For a,b,c,d,e,f,g, try a<b,c<d, then make a<b, c<d;try b<d and let the winner compare with e, then eliminate the winner. Replace the winner with new key. In the worst case, I need another 3 comparisons to eliminate another key. Do it twice, then choose the largest in the last 4 keys. Is that clear? – zerr Nov 11 '10 at 12:45
up vote 6 down vote accepted

Donald Knuth has a chapter on "Minimum-Comparison Selection" in Volume III of The Art of Computer Programming.

Knuth says, "no general method [of selection in the minimum number of comparisons] is evident as yet" but he gives some general methods that come close to the minimum.

Looking at Table 5.3.3–1, we can see that V₄(7) = 10 (that is, you can find the 4th largest of 7 items using at most 10 comparisons), and the algorithm ("found manually by trial and error") is given in the solution to exercise 5.3.3–10.

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It seems TAoCP is necessary. @-@ – zerr Nov 11 '10 at 12:53

If you allow comparisons in parallel (a modern CPU will probably do this for you), you can use a sorting network to solve the problem in six steps.

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