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When looking through the docs of Data.Set, I saw that insertion of an element into the tree is mentioned to be O(log(n)). However, I would intuitively expect it to be O(n*log(n)) (or maybe O(n)?), as referential transparency requires creating a full copy of the previous tree in O(n).

I understand that for example (:) can be made O(1) instead of O(n), as here the full list doesn't have to be copied; the new list can be optimized by the compiler to be the first element plus a pointer to the old list (note that this is a compiler - not a language level - optimization). However, inserting a value into a Data.Set involves rebalancing that looks quite complex to me, to the point where I doubt that there's something similar to the list optimization. I tried reading the paper that is referenced by the Set docs, but couldn't answer my question with it.

So: how can inserting an element into a binary tree be O(log(n)) in a (purely) functional language?

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It doesn't need to copy the entire tree - it only need to copy the nodes from the root to the location of the inserted node. There will be log(n) of these in a balanced binary tree. – Lee Jan 4 '13 at 22:31
The balancing function, for reference, is here:… – notice the docs above it have a simpler version listed. – Ben Millwood Jan 4 '13 at 22:32
(:) is O(1) by definition --- despite the funny name, it is merely a simple constructor. – dave4420 Jan 4 '13 at 22:35
up vote 16 down vote accepted

There is no need to make a full copy of a Set in order to insert an element into it. Internally, element are stored in a tree, which means that you only need to create new nodes along the path of the insertion. Untouched nodes can be shared between the pre-insertion and post-insertion version of the Set. And as Deitrich Epp pointed out, in a balanced tree O(log(n)) is the length of the path of the insertion. (Sorry for omitting that important fact.)

Say your Tree type looks like this:

data Tree a = Node a (Tree a) (Tree a)
            | Leaf

... and say you have a Tree that looks like this

let t = Node 10 tl (Node 15 Leaf tr')

... where tl and tr' are some named subtrees. Now say you want to insert 12 into this tree. Well, that's going to look something like this:

let t' = Node 10 tl (Node 15 (Node 12 Leaf Leaf) tr')

The subtrees tl and tr' are shared between t and t', and you only had to construct 3 new Nodes to do it, even though the size of t could be much larger than 3.

EDIT: Rebalancing

With respect to rebalancing, think about it like this, and note that I claim no rigor here. Say you have an empty tree. Already balanced! Now say you insert an element. Already balanced! Now say you insert another element. Well, there's an odd number so you can't do much there.

Here's the tricky part. Say you insert another element. This could go two ways: left or right; balanced or unbalanced. In the case that it's unbalanced, you can clearly perform a rotation of the tree to balance it. In the case that it's balanced, already balanced!

What's important to note here is that you're constantly rebalancing. It's not like you have a mess of a tree, decided to insert an element, but before you do that, you rebalance, and then leave a mess after you've completed the insertion.

Now say you keep inserting elements. The tree's gonna get unbalanced, but not by much. And when that does happen, first off you're correcting that immediately, and secondly, the correction occurs along the path of the insertion, which is O(log(n)) in a balanced tree. The rotations in the paper you linked to are touching at most three nodes in the tree to perform a rotation. so you're doing O(3 * log(n)) work when rebalancing. That's still O(log(n)).

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And the path of insertion has length O(log N) -- so O(log N) new nodes are created. – Dietrich Epp Jan 4 '13 at 22:35
For a more detailed analysis of how a self-balancing binary search trees does insertion and re-balancing in O(log n), one could take a look at the Red-black tree article ( There are other self-balancing binary search trees than red-black trees, but the idea is similar. – newacct Jan 5 '13 at 0:56

To add extra emphasis to what dave4420 said in a comment, there are no compiler optimizations involved in making (:) run in constant time. You could implement your own list data type, and run it in a simple non-optimizing Haskell interpreter, and it would still be O(1).

A list is defined to be an initial element plus a list (or it's empty in the base case). Here's a definition that's equivalent to native lists:

data List a = Nil | Cons a (List a)

So if you've got an element and a list, and you want to build a new list out of them with Cons, that's just creating a new data structure directly from the arguments the constructor requires. There is no more need to even examine the tail list (let alone copy it), than there is to examine or copy the string when you do something like Person "Fred".

You are simply mistaken when you claim that this is a compiler optimization and not a language level one. This behaviour follows directly from the language level definition of the list data type.

Similarly, for a tree defined to be an item plus two trees (or an empty tree), when you insert an item into a non-empty tree it must either go in the left or right subtree. You'll need to construct a new version of that tree containing the element, which means you'll need to construct a new parent node containing the new subtree. But the other subtree doesn't need to be traversed at all; it can be put in the new parent tree as is. In a balanced tree, that's a full half of the tree that can be shared.

Applying this reasoning recursively should show you that there's actually no copying of data elements necessary at all; there's just the new parent nodes needed on the path down to the inserted element's final position. Each new node stores 3 things: an item (shared directly with the item reference in the original tree), an unchanged subtree (shared directly with the original tree), and a newly created subtree (which shares almost all of its structure with the original tree). There will be O(log(n)) of those in a balanced tree.

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