I'm mostly convinced that there is an answer to this problem, but for the life of me can't figure out how to do it.
Let's say I have three sets:
A = [ 'foo', 'bar', 'baz', 'bah' ] B = [ 'wibble', 'wobble', 'weeble' ] C = [ 'nip', 'nop' ]
And I know how to calculate the cartesian / cross product, (ant it's covered all over the place, on this site and elsewhere) so I won't go over that here.
What I'm looking for is an algorithm that would allow me to simply select a specific item from the cartesian product without generating the whole set or iterating until I reach the nth item.
Of course, I could easily iterate for a small example set like this, but the code I am working on will be working with much larger sets.
Therefore, I'm looking for a function, let's call it 'CP', where:
CP(1) == [ 'foo', 'wibble', 'nip' ] CP(2) == [ 'foo', 'wibble', 'nop' ] CP(3) == [ 'foo', 'wobble', 'nip' ] CP(4) == [ 'foo', 'wobble', 'nop' ] CP(5) == [ 'foo', 'weeble', 'nip' ] CP(6) == [ 'foo', 'weeble', 'nop' ] CP(7) == [ 'bar', 'wibble', 'nip' ] ... CP(22) == [ 'bah', 'weeble', 'nop' ] CP(23) == [ 'bah', 'wobble', 'nip' ] CP(24) == [ 'bah', 'wobble', 'nop' ]
And the answer is produced in O(1) time, more or less.
I've been following the idea that it should be possible, (heck, even simple!) to calculate the indices of the elements from A,B,C that I want and then simply return the them from the original arrays, but my attempts to make this work correctly have so far, um, not worked.