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Providing N horses and M(M <= N) tracks but no timer, all you could get from one round is the order of M horses. The questions how many rounds at least, if you want to get the rank of all horses?

e.g. N=3, M=3, Round=1; N=3, M=2, Round=3; N=4, M=3, Round=3;

what is Round, when N=1000, M=3?

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    Is this homework? What have you tried? Sep 24, 2011 at 3:48
  • Interesting... a sort algorithm for ternary logic.
    – Ed Staub
    Sep 24, 2011 at 4:02
  • It's a question I've meet in a interview, I could not get a precise result, but only a upper bound, using merge-sort. Sep 24, 2011 at 4:07
  • @Ed: Ternary logic would mean that, for every pair of horses, you have three different possible outcomes (for example, "A wins", "B wins", and "too close to call"). What we have here is a slightly different setting (a triple of horses and 3!=6 possible outcomes per round).
    – Martin B
    Sep 24, 2011 at 6:16
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    I've found a paper proposed last year. math.illinois.edu/REGS/reports10/HanKimMc10.pdf Sep 24, 2011 at 10:10

2 Answers 2

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You can get a lower bound with information theory.

Each race gives you log(m!) bits of information, and you need log(n!) bits. So a natural lowerbound on the number of races is then log(n!) / log(m!).

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Formal definition of the problem -

http://www.math.uiuc.edu/~west/regs/ksetsort.html

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