# How to efficiently calculate a conditional product of small size?

This might be more of a math problem than a programming problem, but I've been thinking about this for a while and am having a hard time figuring out if this is a solvable problem.

I have the following:

• Sets A, B sourced from some set of symbols
• A boolean function F : A × B → {0,1}

I wish to construct the set C = {(x,y) : x ∈ A, y ∈ B, with F(x,y) = 1}.

( F can be calculated in O(1) for any pair )

Now up to this point, this calculation would basically consist in just a filter on A × B via the function F, running in O(|A| × |B|), if F is constant time.

However, I know one property of C that I feel could help me...

I know that |C| << |A| |B|, in fact I'm pretty sure that |C| is about |A|. I feel like there's some way to exploit this (I've recently been introduced to probabalistic algorithms, which I feel could help, but I'm definitely not sure).

I imagine some forms of auxiliary structures would be necessary to solve this, which shouldn't be too problematic in themselves, so long as the structures are only polynomial to the size of A ( calculating the power sets might be a bit much, A can be a bit big).

This also feels like something that has been proven to have some sort of lower bound complexity, but I don't really have the academic knowledge to prove it.

Any guidance, hints on what domains I should be looking in would be greatly appreciated.

What I have thought about so far:

• This seems a lot like a SAT issue but I know next to nothing about those things

• This problem feels slightly isomorphic to the problem of set discrimination (at least... calculating the difference between two sets). I am , however, unable to find any research on the topic in this form (Only getting a lot of "iterate over A, iterate over B" type answers).

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Is your F such that, for fixed x, you can find the y such that F(x,y) = 1 efficiently? –  dmuir Nov 5 '12 at 13:01
Yes, but F is far from sparse: I've assumed that , for fixed x , the set { y : F(x,y)=1 } is about the same size as B. –  rtpg Nov 5 '12 at 13:08
If your last comment is true, then `|C|` is about the same size as `|A|*|B|`, which contradicts your question. And to answer your question, what you want is not possible without more information about `F`, as you'll need to call `F` on all possible pairs. –  interjay Nov 5 '12 at 13:35
While my last comment holds (at least, I am not allowed to make the opposite assumption), in the specific use case I'm considering, I'm pretty sure that the size approximation is true. There might be some property of F that I'm not considering here I will try to add some context later, but first I need some sleep. –  rtpg Nov 5 '12 at 14:50