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Given n samples and p >> n (discrete) data points for each of the n samples, what is a good algorithm for finding a smallest possible set of k data points such that those k data points discriminate between all n samples?

For my purposes, a good algorithm that finds an approximately smallest set would also suffice.

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just to verify, that I understand this correctly, k>=log(n), right? –  Karoly Horvath Aug 4 '11 at 21:15
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Also to clarify, when you say "discriminate between all n samples," I assume that you're looking for a set of indices such that for each index, all the data points at that index have different values? Or do you mean that given just the k columns from the data points, no two samples will appear the same? The former is a much stronger condition than the latter, so I'd like to make sure I'm thinking about the right problem. :-) –  templatetypedef Aug 4 '11 at 21:22
    
I thought there are no "columns", it's just a set of data points –  Karoly Horvath Aug 4 '11 at 21:33
    
I'm just doing some tests.. what is the range of n and p, and how diverse are data points? –  Karoly Horvath Aug 4 '11 at 22:30

2 Answers 2

up vote 1 down vote accepted

It sounds as though your problem is closely related to the test cover problem. The test cover problem is, given a ground set X = {1, …, n} and a collection T = {T1, …, Tm} of subsets of X, to find the smallest subcollection U of T such that for all y ≠ z in X, there exists a set S in T such that either (x in S and y not in S) or (x not in S and y in S).

The test cover problem is NP-hard, so in practice, optimal solutions are found using branch and bound techniques. See De Bontridder et al.

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How can you transform one problem to the other? –  Karoly Horvath Aug 4 '11 at 23:04
    
@yi_H If the data points are binary, then let Ti consist of the samples with 1 for the ith data point. –  newb Aug 4 '11 at 23:06

Here is a simple greedy algorithm, shouldn't generate too bad results:

Check if data points are same for two different elements, if so, there is no solution.

  • In each step we add one new data point to the set k.
  • We test all the different points in all of the p in n.
    • Try to add that point to k.
    • The new k divides n into a couple of distinct sets (some of these contain just one element, some more.. finally all will contain just one).
    • Pick the point which generates the most sets.
  • Do this till all sets are distinct.
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