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_i`

s 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.}

`{yi}`

would necessarily be a member of the collection`{xi}`

? – lurker Sep 18 '13 at 21:09