# Computing set intersection in linear time?

Is there an algorithm that, given two sets, computes their intersection in linear time?

I can run two for loops to check all pairs of elements, recording elements that I find in both of the sets. However, the runninng time will be O(n2). How do I do this in O(n) time?

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Combine the two arrays and count the no of occurrences of each element in this combined array and put these in a new array. Then check this count array for entries which contain 2, those elements are in intersection of the two sets.

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if one of the two lists is ordered, then we can start with the unordered list

FUNCTION: INTERSECTION ( LIST A, LIST B )
{
CREATE C AS EMPTY LIST

FOR EVERY: NUMBER n IN A
{
IF BINARY-SEARCH(n) IN B
{
}
}

RETURN C
}


Time Complexity = O(n O(BINARY-SEARCH)) = O(n log n)

if list B is hashed, then we've BIG-THETA(C n + T(hash))

where BIG-THETA is the asymptotic average, and C is a constant and T(hash) is time needed for the hash function

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I wonder nobody mentioned hashtable.
Regardless of your set implementation (even if 'set' here means a simple array), you can

1. put contents of the first set into hashtable and
2. iterate over second set, checking if hashtable contains current element.

O(n)

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That depends on your set implementation.

If you have a hash set (O(1) lookup), then the approach indicated by all the other posters is correct. Iterate across all the elements in the first set. If it's in the second set, then add it to the result. This runs in O(n) time.

If you have a tree set (O(lg n) lookup), then this approach will work, but it runs in O(n lg n) time. You can do better; there's an O(n) solution. I assume that you have some sort of iterator that can traverse the elements of the two sets in ascending order. If you do, then the question is "given two lists in sorted order, find their intersection." This can be done using a modified version of the algorithm you use to merge two ranges. The idea is to keep track of the two iterators. At each step, compare the first elements of the ranges. If they're equal, add the element to the intersection and advance both iterators forward. If the first is less than the second, then advance the first iterator. If the first element is greater, then advance the second iterator. This runs in time O(n) because each iteration consumes at least one element, and there's only O(n) elements in total.

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The two sets are not sorted.What If I use merge sort technique and then follow your method of comparing the first elements of the ranges,but im not sure it will work in O(n) bcoz merge sort takes O(nlogn)time –  NEO Jan 9 '11 at 22:27
If you put the sets in sorted order in O(n lg n) time, this technique should work out, but it won't run in linear time because of the sort overhead. How are your sets represented? –  templatetypedef Jan 9 '11 at 22:37
sets are in an array. –  NEO Jan 9 '11 at 22:52
I mean 2 diff integer arrays –  NEO Jan 9 '11 at 22:55
Just iterate over both lists, adding them to a hash table, then apply the "intersect two hash tables" algorithm. –  templatetypedef Jan 9 '11 at 22:55
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A set type should have an O(1) test-membership operation. With that you can loop over one set and test if the items belong to the other set.

Pseudo-code:

intersection = set()

for item in a:
if item in b:


As an optimization you can check the sizes of the sets beforehand and ensure that a is the smaller of the two sets.

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intersection(a, b):
result = new empty set
for x in b:
if a contains x:

return result


If the contains test is constant time (such as in a set that uses a hash table as an implementation), then this algorithm is O(n).

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