Binary Trees
The simplest form of tree is a binary tree. A binary tree consists of- a node (called the root node) and
- left and right sub-trees.
Both the sub-trees are themselves binary trees.
The nodes at the lowest levels of the tree (the ones with no sub-trees) are called leaves.
In an ordered binary tree,
The AddToCollection method is, naturally, recursive.
Similarly, the FindInCollection method is recursive.
First, we need to work out how many nodes, n, we have in such a tree of height, h.
Now,
However, Add also requires ceiling( log2n ) comparisons to determine where to add an item. Actually adding the item takes a constant number of operations, so we say that a binary tree requires O(logn) operations forboth adding and finding an item - a considerable improvement over binary search for a dynamic structure which often requires addition of new items.
Deletion is also an O(logn) operation.
General Binary Trees
However, in general addition of items to an ordered tree will not produce a complete tree. The worst case occurs if we add an ordered list of items to a tree.
This problem is readily overcome: we use a structure known as a heap. However, before looking at heaps, we should formalise our ideas about the complexity of algorithms by defining carefully what O(f(n)) means.
Key Terms
Root Node
In an ordered binary tree,
- the keys of all the nodes in the left sub-tree are less than that of the root,
- the keys of all the nodes in the right sub-tree are greater than that of the root,
- the left and right sub-trees are themselves ordered binary trees.
Data Structure
The data structure for the tree implementation simply adds left and right pointers in place of the next pointer of the linked list implementation.The AddToCollection method is, naturally, recursive.
Similarly, the FindInCollection method is recursive.
Analysis
Complete Trees
Before we look at more general cases, let's make the optimistic assumption that we've managed to fill our tree neatly, ie that each leaf is the same 'distance' from the root.This forms a complete tree, whose height is defined as the number of links from the root to the deepest leaf. |
Now,
n = 1 + 21 + 22 + .... + 2hFrom which we have,
n = 2h+1 - 1and
h = floor( log2n )Examination of the Find method shows that in the worst case, h+1 or ceiling( log2n ) comparisons are needed to find an item. This is the same as for binary search.
However, Add also requires ceiling( log2n ) comparisons to determine where to add an item. Actually adding the item takes a constant number of operations, so we say that a binary tree requires O(logn) operations forboth adding and finding an item - a considerable improvement over binary search for a dynamic structure which often requires addition of new items.
Deletion is also an O(logn) operation.
General Binary Trees
However, in general addition of items to an ordered tree will not produce a complete tree. The worst case occurs if we add an ordered list of items to a tree.
This problem is readily overcome: we use a structure known as a heap. However, before looking at heaps, we should formalise our ideas about the complexity of algorithms by defining carefully what O(f(n)) means.
Key Terms
Root Node
- Node at the "top" of a tree - the one from which all operations on the tree commence. The root node may not exist (a NULL tree with no nodes in it) or have 0, 1 or 2 children in a binary tree.
- Leaf Node
- Node at the "bottom" of a tree - farthest from the root. Leaf nodes have no children.
- Complete Tree
- Tree in which each leaf is at the same distance from the root. A more precise and formal definition of a complete tree is set out later.
- Height
- Number of nodes which must be traversed from the root to reach a leaf of a tree.