# union/intersection of 2 sets, where each set are defined by it's subsets

We know every set's definition from the union of other sets.

For example

A = B union {1,2}

B = C union D

C = {5,6}

D = {5,7}

E = {4}

then A = {1,2,5,6,7}

A union E = {1,2,4,5,6,7}

Are the any efficient algorithms to do that. Suppose the hierarchy of unions can be really deep, and the subsets can change pretty often(not that much). I think there should be ways to minimize reduce the amount of unions one have to make.

-
If B is C union D then its {5,6,7}, and A is {1,2,5,6,7} – martin clayton Oct 23 '09 at 23:45
thx, that's a typo. – user195682 Oct 23 '09 at 23:57

So you have a unchanging hierarchy of unions of changing sets? And you are, like in your example, only interested in the value of one set?

Then flatten the hierarchy. That is, in your example you would once walk through the hierarchy to find the set of changing sets your set is the union of, and store this set.

To dispense with recomputing unions whenever a leaf set changes, you could track for each element in how many sets it is currently contained. This can be updated quickly if a leaf set changes, and those not required looking at any unchanged leaf sets. Then, those elements with frequency count > 0 are currently in the union.

-
but won't memory grow exponentially to the depth of the hierarchy? – user195682 Oct 24 '09 at 2:05
The flattened hierarchy is the set of leaf sets. Therefore, its size is linear in the number of different leaf sets. If sets are all different and your hierarchy is a balanced tree, that would be exponential in its height. – meriton Oct 24 '09 at 13:44

Perhaps you're looking for some sort of disjoint set data structure?

-