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Suppose we have N sets x1,x2,x3,x4,x5...xN

They are not disjoint. ( or problem becomes trivial )

Is there algorithm for finding minmal basis sets y1,y2,y3 .. yM etc

such that each x1,x2,x3 etc are the union of some combination of y1,y2,y3 .. yM etc ?

By minimum I mean make M the lowest number possible?

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this would be better on math.stackexchange.com ... –  Vicky Sep 18 '13 at 12:05
    
Is it required that the yi are disjoint? –  Henry Sep 18 '13 at 12:07
1  
Seems similar: en.wikipedia.org/wiki/Set_cover_problem –  BartoszKP Sep 18 '13 at 12:07
    
And is it also be required that any union of subsets from the collection {yi} would necessarily be a member of the collection {xi}? –  lurker Sep 18 '13 at 21:09

1 Answer 1

One similar problem, that comes to mind, is finding the basis of a vector space or finding a minimal generating set, respectively.

As the number of sets and thus the universe over all possible elements is a finite number, we could rewrite each set as a vector like this (assuming integer numbers as elements inside the sets):

{ 1, 2, 5 } => ( 1, 1, 0, 0, 1, 0 , ... )
{ 4 }       => ( 0, 0, 0, 1, 0, ... )

The set of all the vectors x_is now form a (trivial) generating set G for the universe of all sets x_i.

You search for a minimal generator. To do so, we have to eliminate all linear dependencies from the vector set G. A naive approach would be to check all triples with elements of G for the following condition (x,y,z vectors of G and k,l,m numbers):

  k * x + l * y  + m * z == 0

If the condition is satisfied, we eliminate one vector of those three. (It does not really matter which one).

The such reduced set of vectors (and their respective sets) form a basis for you set of sets.

One requirement for the above argument is, that you allow for set difference as an operation to generate your sets.

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Yes set difference I can allow. That is okay if it makes problem easier. –  steviekm3 Sep 18 '13 at 12:36
    
@user1080552 Then the above approach should work. –  Sirko Sep 18 '13 at 12:39
    
do {0,0},{0,1},{1,0},{1,1} form a vector space ? –  steviekm3 Sep 18 '13 at 12:58
    
@user1080552 That's a generating set, but not a minimal one. 1 * (0,1) + 1 * (1,0) == (1,1) so at least one of those three should be dropped. (0,0) is the origin, which is part of any vector space, but is not part of the generating set (you can't create any other vector from it). So in the end just (0,1) and (1,0) could form your minimal generating set. –  Sirko Sep 18 '13 at 13:01

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