Efficiently finding the intersection of a variable number of sets of strings

I have a variable number of ArrayList's that I need to find the intersection of. A realistic cap on the number of sets of strings is probably around 35 but could be more. I don't want any code, just ideas on what could be efficient. I have an implementation that I'm about to start coding but want to hear some other ideas.

Currently, just thinking about my solution, it looks like I should have an asymptotic run-time of Θ(n2).

Thanks for any help!

tshred

Edit: To clarify, I really just want to know is there a faster way to do it. Faster than Θ(n2).

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Thanks for the help everyone! The strings are actually inside objects in an already existing array list, this is why I was leaving them in the arrays. I've never had to use the Java collections classes being mentioned but will definitely use them. I appreciate the recommendations. Problem solved. – tshred May 17 '10 at 19:38

`Set.retainAll()` is how you find the intersection of two sets. If you use `HashSet`, then converting your `ArrayList`s to `Set`s and using `retainAll()` in a loop over all of them is actually O(n).

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Beat me to it :) – Chris Dennett May 17 '10 at 19:13
You only have to wrap one of the lists in a set. – Hans Nov 9 '14 at 18:17

The best option would be to use HashSet to store the contents of these lists instead of ArrayList. If you can do that, you can create a temporary HashSet to which you add the elements to be intersected (use the putAll(..) method). Do tempSet.retainAll(storedSet) and tempSet will contain the intersection.

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One more idea - if your arrays/sets are different sizes, it makes sense to begin with the smallest.

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There is also the static method `Sets.intersection(set1, set2)` in Google Guava that returns an unmodifiable view of the intersection of two sets.

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You can use single HashSet. It's add() method returns false when the object is alredy in set. adding objects from the lists and marking counts of false return values will give you union in the set + data for histogram (and the objects that have count+1 equal to list count are your intersection). If you throw the counts to TreeSet, you can detect empty intersection early.

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Sort them (n lg n) and then do binary searches (lg n).

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