# Running time of set union operation

Given two sets A and B, what is the common algorithm used to find their union, and what is it's running time?

My intuition:

``````a = set((1, 2, 3))
b = set((2, 3, 5))
union = set()
for el in a:

for el in b:
``````

Add checks for a collision, which is O(1), and then adds the element, which is (??). This is done n times (where n is |a| + |b|). So this is O(n * x) where x is avg running time for the add operation.

Is this correct?

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This is very much implementation dependent. Others have mentioned sets based on comparables (have a less-than for sorting) or hashables (have a good hash function for hashing). Another possible implementation involved "union-find", which only supports a specialized subset of usual set operations but is very fast (union is amortized constant time, I think?), you can read about it here

http://en.wikipedia.org/wiki/Union_find

and see an example application here

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The complexity of add/find(collision), would depend on the implementation of union.

If you are using some hashtable based datastructure then your collision operation will indeed be constant assuming a good hash function.

Otherwise, add will probably be O(Log(N)) for a sorted list/tree datastructure.

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First answer: If you are dealing with sets of numbers, you could implement a set as a sorted vector of distinct elements. Then you could implement union(S1, S2) simply as a merge operation (checking for duplicates), which takes O(n) time, where n = sum of cardinalities.

Now, my first answer is a bit naive. And Akusete is right: You can, and you should, implement a set as a hash table (a set should be a generic container, and not all objects can be sorted!). Then, both search and insertion are O(1) and, as you guessed, the union takes O(n) time.