# What are some algorithms for incrementally building a balanced binary tree with no order constraints?

I am interested in taking a list of elements and turning them into a balanced binary tree with each element on a leaf of the tree. Furthermore, I want to build the tree with an algorithm that only sees one element at a time, rather than the whole list at once. Finally, this tree has no ordering constraints --- that is, it is not a search tree, so the nodes can be in any order.

My question is: there are lots of algorithms for incrementally building up binary search trees, but what are some algoritms for building up balanced binary trees without any ordering constraint? They ought to be more efficient as they don't have to worry about preserving any order relations between the nodes.

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Why do you need a tree without an order? Seems like any other use of the data structure is useless without the ordering. –  Dusty Campbell Feb 22 '14 at 4:02
The tree represents a search space; each node represents a choice between two options, and the leaves represent elements being searched for; the reason for building this tree is to facilitate parallelizing and checkpointing during a search. I do not care about the order in which I find the elements as long as I find all of them. –  Gregory Crosswhite Feb 23 '14 at 22:48

You can do it in linear time. For each 2 elements, you need a parent. For each 2 of those, you need another and so on. Can't do it any better though.

First you make N nodes for each data point you have - then you just start working your way back up - connect each two leafs together with a node, then each 2 of those parent nodes together, etc, until you get to 1 node.

Or you can work your way down -- at any level N you get 2^N children.

``````nodes = [...data...]

root = data.first; <== returns first element without removing it from nodes
while data.size > 1
a=data.pop_front
b=data.pop_front

root = new node(a,b) <== create new node with a and b as children
data.push_back(root)
``````

when you leave the while loop, root contains the top of your tree.

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Cool! Does the approach you describe here have a name? I ask because it would be nice to have a term I could use to refer to it in my code. –  Gregory Crosswhite Jun 11 '13 at 6:59
I just made it up. I mean I'm sure I'm not the first, but I just came up with it on my own. You can call it the Bottom-up Binary Building Algorithm (or bubba for short) –  xaxxon Jun 11 '13 at 7:43