# Binary Tree arraly list represenation

I have been doing some research on Binary trees, and the array list representation. I am struggling to understand that the worst case space complexity is O(2^n). Specifically, the book states, the space usage is O(N) (N = array size), which is O(2^n) in the worst case . I would have thought it would have been 2n in the worst case as each node has two children (indexes) not O(2^n), where n = no. of elements.

an example, if I had a binary tree with 7 nodes, then the space would be 2n = 14 not 2^n = 128.

-
also known as `Heap`. And when you said space is (2^n), did you mean `2^height` –  Nishant Oct 29 '12 at 4:26

This is Heap implementation on an array. Where

``````A[1..n]
left_child(i) = A[2*i]
right_child(i) = A[2*i+1]
parent(i) = A[floor(i/2)]
``````

Now, come to space. Think intuitively,

when you insert first element n=1, location=A[1], similarly,

``````n=2 @A[2] left_child(1)
n=3 @A[3] right_child(1)
n=4 @A[4] left_child(2)
n=5 @A[5] right_child(2)
``````

You see, nth element will go into `A[n]`. So space complexity is `O(n)`.

When you code you just plug-in the element to be inserted in the end say at `A[n+1]`, and say that it's a child of `floor((n+1)/2)`.

Heap is a nearly complete tree, so total number of elements in the tree would be `2h-1 < n <= 2h+1-1` and this is what the length of array you will need. Refer: this

-

The worst case space complexity of a binary tree is O(n) (not O(2^n) in your question), but using arrays to represent binary trees can save the space of pointers if it's nearly a complete binary tree.

-
In this representation, the root is stored at index `0` in the array, and for any node with index `n`, its left and right children are stored at indices `2n+1` and `2n+2`, respectively.
If you have a degenerate tree where no nodes have any right children (the tree is effectively a linked list), then the first items will be stored at indices `0, 1, 3, 7, 15, 31, ...`. In general, the `n`th item of this list (starting from `0`) will be stored at index `2n-1`, so in this case the array representation requires `θ(2n)` space.