Say I have a matrix `S`

of size `(m,n)`

, where `m`

is the number of sets, and `n`

the number of all possible elements sets can have. In this matrix, if the entry `S(i,j)`

is `1`

, the set `i`

has element `j`

, and otherwise the element `S(i,j)`

is `0`

.

My question is: are there any known relatively efficient algorithms to enumerate **all possible set packings** (i.e. combinations of sets such that no two sets intersect)?

Using this representation, a packing `k`

is defined as a vector
`p_k = [p_{k,1}, p_{k,1}, ... p_{k,km}]`

where the elements `p_{k,r}`

are row indices in `S`

(i.e. sets) such that the intersection of of the sets in `p_k`

is `0`

. Or in other words, the inner product of any two row vectors `p_{k,r} * p_{k,s}'`

indexed by `p_k`

in `S`

is `0`

.

I'm looking for an implementation in MATLAB (or something callable from MATLAB), but if anybody knows of a fast implementation in some other library, that would also be helpful.

allelements (i.e. n elements at`1`

when combined)? – Laurent' Oct 11 '11 at 15:04