2

Searched is an algorithm, to create an "optimal summary" of a list of permutations (or tuples).

Example, you have the tuples:

1-2-3
1-2-4

the summary would be:

1-2-3/4

the optimal summary would be, for any set of tuples, the minimum number of summarized lines.

Example, for the input:

4-2-3
1-2-3
4-5-6
4-5-3

the "optimal summary" would be:

1/4-2-3
4-5-3/6

a suboptimal solution would be:

1-2-3
4-2/5-3
4-5-6

1/4-2/5-3/6 would not be a solution, because that would contain the tuple 1-2-6, which isn't in the input set

The order of the input/output is not important:

1-2-3
1-2-4

is the same input as

1-2-4
1-2-3

but of course in the tuples, the order is important:

1-2-3

is not the same as

3-2-1

the algorithm should run in under 1 second for an input set of ~200 3-tuples, on a typical machine.

Assumption: there will be no duplicate tuples in the input set

the input:

1-2-3
1-2-3

is invalid

  • OK, and the question?... – vish4071 Nov 10 '15 at 15:45
  • And, can't the optimal summary in 2nd example be: 1/4, 2/5, 3/6? If not, why? – vish4071 Nov 10 '15 at 15:46
  • that would include the tuple 1-2-6, but that was not in the input set! – user1803928 Nov 10 '15 at 15:52
  • the question of course is to provide an algorithm which computes the optimal solution (and brute force is not feasible in this case) – user1803928 Nov 10 '15 at 15:52
  • 2
    I'm pretty sure this is equivalent to the Set Cover Problem, and is therefore NP-Complete. – rici Nov 10 '15 at 16:22

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