Trees 2: Linked Representation, Tree Traversal, and Binary Search Trees
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1 Trees 2: Linked Representation, Tree Traversal, and Binary Search Trees
2 Linked representation of binary tree Again, as with linked list, entire tree can be represented with a single pointer -- in this case, a pointer to the root node Nodes are instances of class BTnode, described in the next several slides The class contains methods that operate on single nodes Since each node is potentially the root node of a tree (or subtree), we will also include operations on entire trees
3 Linked representation of binary tree
4 Methods of BTnode class
5 Methods of BTnode class
6 Static methods operate at tree level Accessors (entire tree): treesize() returns number of nodes in tree treecopy() returns a new tree copied from a source tree argument
7 Output methods
8 Constructor
9 Simple accessor methods
10 Recursive accessors
11 Mutators
12 Mutators
13 Static methods public static <E> BTNode<E> treecopy(btnode<e> source) { BTNode<E> leftcopy, rightcopy; if (source == null) return null; else { leftcopy = treecopy(source.left); rightcopy = treecopy(source.right); return new BTNode<E>(source.data, leftcopy, rightcopy); } }
14 Static methods
15 Tree traversal
16 Now, more ways to climb!
17 Example: printing all nodes // pre-order traversal public void preorderprint( ) { System.out.println(data); if (left!= null) left.preorderprint( ); if (right!= null) right.preorderprint( ); }
18
19 Example: printing all nodes
20
21 Example: printing all nodes (part 1)
22 Example: printing all nodes (part 2)
23 Example: printing all nodes (part 3)
24
25 A forest full of trees The generic BTNode class we have seen thus far can be used to create many types of data structures derived from binary trees Now we will look at a specific ADT based on the generic binary tree: binary search trees
26 BST characteristics Based on binary trees Defining quality has to do with the order in which data are stored Commonly used in database applications where rapid retrieval of data is desired
27 Binary Search Trees Entries in a BST must be objects to which total order semantics apply -- in other words, objects for which all the binary comparison operations are defined Storage rules -- for every node n: every entry in n s left subtree is less than or equal to the entry in n every entry in n s right subtree is greater than n s entry
28 Unlike a heap, a BST has no special requirement for the tree to maintain a particular shape but a balanced tree (in which there are approximately the same number of nodes in each subtree) facilitates data searching Binary Search Tree
29 The Dictionary Data Type A dictionary is a collection of items, similar to a bag. Unlike a bag, each item is ordered according to an intrinsic or extrinsic value called the item's key. We have seen how a hash table might be used to implement the Dictionary ADT; now we'll implement it as binary search tree
30 A Dictionary of States in BST Form Storage rules: Every key to the left of a node is alphabetically before the key of the node. Every key to the right of a node is alphabetically after the key of the node.
31 Start at the root. If the current node has the key, then stop and retrieve the data. If the current node's key is too large, move left and repeat previous steps If the current node's key is too small, move right and repeat previous steps Retrieving Data
32 Adding Pretend that you are trying to find the key, but stop when there is no node to move to. Add the new node at the spot where you would have moved to if there had been a node.
33 Where would you add the 51 st state? Adding
34 Removing an Item with a Given Key Find the item. If necessary, swap the item with one that is easier to remove. Remove the item.
35 Removing an Item with a Given Key Find the item. If the node is not a leaf: If the node has 1 child, replace the parent with the child If the item has 2 children, rearrange the tree: Find smallest item in the right subtree Copy that smallest item onto the one that you want to remove Remove the extra copy of the smallest item (making sure that you keep the tree connected) Else just remove the item.
36 Summary Binary search trees are a good implementation of data types such as sets, bags, and dictionaries. Searching for an item is generally quick since you move from the root to the item, without looking at many other items. Adding and deleting items is also quick. But it is possible for the quickness to fail in some cases -- can you see why?
37 Worst-case times for tree operations For a tree of depth d, all of the following are O(d) applications in the worst case: adding an entry to a binary search tree or heap deleting an entry from a binary search tree or heap search for an entry in a binary search tree (we don t search heaps) treebigo 37
38 Heap analysis By definition, a heap is a complete binary tree Maximum nodes at each level: root node (level 0) : 1 (2 0 ) nodes root s children (level 1): 2 (2 1 ) nodes root s grandchildren (level 2): 4 (2 2 ) nodes At level d, there are 2 d nodes treebigo 38
39 Heap analysis So, for a heap to reach depth d, it must have ( (d-1) ) + 1 nodes Simplifying the formula: (d-1) (d-1) (d-1) 2 (d-1) + 2 (d-1) = 2 d treebigo 39
40 Since Worst-case times for heap d (depth) = log 2 2 d operations and n (number of nodes) >= 2 d log 2 n >= log 2 2 d so log 2 n >= d Adding or deleting an entry is O(d); since d<=log 2 n, worst-case scenario for heap operations is O(log 2 n) or just O(log n) treebigo 40
41 Significance of logarithms Logarithmic algorithms are those (such as heap operations) with worst-case time of O(log n) For a logarithmic algorithm, doubling the input size (N) will make the time required increase by a (small) fixed number of operations treebigo 41
42 Significance of logarithms Example: adding a new entry to a heap with n entries In worst case, the algorithm may examine as many as log 2 n nodes Doubling the number of nodes to 2n would require the algorithm to examine as many as log 2 2n nodes -- but that is just 1 more than log 2 n (example: log = 10, log = 11) treebigo 42
43 Depth is not the whole story for binary search trees Time analysis on the basis of depth is not always the most useful measure -- these two binary search trees have the same depth: treebigo 43
44 Analysis based on number of entries in a BST The maximum depth of a binary search tree is n-1 (because there must be at least one node at each level) So the worst-case time for a binary search tree (O(d)) converts to O(n-1), or just O(n) treebigo 44
45 The problem of balance In the best case, the average execution time for the following operations on a binary search tree: Search Insertion Deletion is a respectable O(log N). The average actual time (mathematically beyond the scope of this course) is about twice that still very good (and better than any sorting algorithm we ve seen, including HeapSort) But worst case is O(N)
46 The problem of balance Binary search trees are usually balanced only if insertion occurs in random order: Perfectly balanced Unbalanced (entries were added in reverse order) More typical fairly balanced
47 Red-black trees: a variation on the BST Goal: keep the tree balanced by: Adding an extra data field to each node represented as a color, either red or black (but really just a boolean value) Imposing a set of rules related to node color (see next slide) Graphic source: Wikipedia
48 Red-Black Tree Rules Every node is either red or black Null nodes (links from leaves) are always black Red nodes have 2 black children (note that this means that leaf nodes can be either red or black) If a node is red, its parent is black Every path from any node to its lowest leaf s null link(s) contains the same number of black nodes (not counting the origin node)
49 Enforcing the rules: rotation Operation on a parent node and one of its children Left rotation: parent node swaps positions with its right child Right rotation: parent node swaps positions with its left child May involve color changes May propogate up the tree
50 Rotation Source: Wikipedia
51 Recoloring Thank you Wikipedia!
52 Red-Black Tree Live!
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