# Intersection complexity

In Python you can get the intersection of two sets doing:

``````>>> s1 = {1,2,3,4,5,6,7,8,9}
>>> s2 = {0,3,5,6,10}
>>> s1 & s2
set([3, 5, 6])
>>> s1.intersection(s2)
set([3, 5, 6])
``````

Anybody know the complexity of this intersection (&) algorithm?

EDIT: In addition, does anyone know what is the data structure behind a Python set?

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The answer appears to be a search engine query away. You can also use this direct link to the Time Complexity page at python.org. Quick summary:

``````Average:     O(min(len(s), len(t))
Worst case:  O(len(s) * len(t))
``````

EDIT: As Raymond points out below, the "worst case" scenario isn't likely to occur. I included it originally to be thorough, and I'm leaving it to provide context for the discussion below, but I think Raymond's right.

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that's a nasty worst case, isn't it? –  juliomalegria Nov 12 '11 at 4:19
I was surprised by it as well! Maybe it's an issue of having different data types mixed in the two sets being intersected? –  Kurt McKee Nov 12 '11 at 4:22
It doesn't look like it uses a sort first (which requires the objects have an ordering), but rather just does a "hash probe": perhaps for a better `C` and Average (and no ordering requirement). The maximum required complexity, AFAIK, is about `O(n log n) + O(n)`, with a sort. However, Big-O is an upper-bounds and there are practical considerations so... –  user166390 Nov 12 '11 at 4:26
I think the major issue here is that the set is an unordered collection. In C++, you can make an intersection (with two sorted lists) in 2*(L1+L2)-1. That's a damn good complexity! cplusplus.com/reference/algorithm/set_intersection –  juliomalegria Nov 12 '11 at 4:27
Nice! I really appreciate the insight; hash collisions make bunches of sense. +1's all around! –  Kurt McKee Nov 12 '11 at 4:42

The intersection algorithm always runs at O(min(len(s1), len(s2))).

In pure Python, it looks like this:

``````    def intersection(self, other):
if len(self) <= len(other):
little, big = self, other
else:
little, big = other, self
result = set()
for elem in little:
if elem in big:
According to the wiki I linked above, the worst case for `elem in big` in your code is O(n) (although the average is of course O(1)). That's the basis for the intersection worst case of O(len(s)*len(t)). Any idea why? –  Kurt McKee Nov 12 '11 at 4:33