Data Structures Using C++1 Chapter 11 Binary Trees
Data Structures Using C++2 Chapter Objectives Learn about binary trees Explore various binary tree traversal algorithms Learn how to organize data in a binary search tree Discover how to insert and delete items in a binary search tree Explore nonrecursive binary tree traversal algorithms Learn about AVL (height-balanced) trees
Data Structures Using C++3 Binary Trees Definition: A binary tree, T, is either empty or such that: –T has a special node called the root node; –T has two sets of nodes, LT and RT, called the left subtree and right subtree of T, respectively; –LT and RT are binary trees
Data Structures Using C++4 Binary Tree
Data Structures Using C++5 Binary Tree With One Node The root node of the binary tree = A L A = empty R A = empty
Data Structures Using C++6 Binary Trees With Two Nodes
Data Structures Using C++7 Binary Trees With Two Nodes
Data Structures Using C++8 Various Binary Trees With Three Nodes
Data Structures Using C++9 Binary Trees Following struct defines the node of a binary tree: template struct nodeType { elemType info; nodeType *llink; nodeType *rlink; };
Data Structures Using C++10 Nodes For each node: –Data is stored in info –The pointer to the left child is stored in llink –The pointer to the right child is stored in rlink
Data Structures Using C++11 General Binary Tree
Data Structures Using C++12 Binary Tree Definitions Leaf: node that has no left and right children Parent: node with at least one child node Level of a node: number of branches on the path from root to node Height of a binary tree: number of nodes no the longest path from root to node
Data Structures Using C++13 Height of a Binary Tree Recursive algorithm to find height of binary tree: (height(p) denotes height of binary tree with root p): if(p is NULL) height(p) = 0 else height(p) = 1 + max(height(p->llink), height(p- >rlink))
Data Structures Using C++14 Height of a Binary Tree Function to implement above algorithm: template int height(nodeType *p) { if(p == NULL) return 0; else return 1 + max(height(p->llink), height(p->rlink)); }
Data Structures Using C++15 Copy Tree Useful operation on binary trees is to make identical copy of binary tree Use function copyTree when we overload assignment operator and implement copy constructor
Data Structures Using C++16 Copy Tree template void copyTree(nodeType * &copiedTreeRoot, nodeType * otherTreeRoot) { if(otherTreeRoot == NULL) copiedTreeRoot = NULL; else { copiedTreeRoot = new nodeType ; copiedTreeRoot->info = otherTreeRoot->info; copyTree(copiedTreeRoot->llink, otherTreeRoot->llink); copyTree(copiedTreeRoot->rlink, otherTreeRoot->rlink); } }//end copyTree
Data Structures Using C++17 Binary Tree Traversal Must start with the root, then –Visit the node first or –Visit the subtrees first Three different traversals –Inorder –Preorder –Postorder
Data Structures Using C++18 Traversals Inorder –Traverse the left subtree –Visit the node –Traverse the right subtree Preorder –Visit the node –Traverse the left subtree –Traverse the right subtree
Data Structures Using C++19 Traversals Postorder –Traverse the left subtree –Traverse the right subtree –Visit the node
Data Structures Using C++20 Binary Tree: Inorder Traversal
Data Structures Using C++21 Binary Tree: Inorder Traversal template void inorder(nodeType *p) { if(p != NULL) { inorder(p->llink); cout info<<” “; inorder(p->rlink); }
Data Structures Using C++22 Binary Tree: Traversals template void preorder(nodeType *p) { if(p != NULL) { cout info<<” “; preorder(p->llink); preorder(p->rlink); } template void postorder(nodeType *p) { if(p != NULL) { postorder(p->llink); postorder(p->rlink); cout info<<” “; } }1
Data Structures Using C++23 Implementing Binary Trees: class binaryTreeType Functions Public –isEmpty –inorderTraversal –preorderTraversal –postorderTraversal –treeHeight –treeNodeCount –treeLeavesCount –destroyTree Private copyTree Destroy Inorder, preorder, postorder Height Max nodeCount leavesCount
Data Structures Using C++24 Binary Search Trees Data in each node –Larger than the data in its left child –Smaller than the data in its right child A binary search tree,t, is either empty or: –T has a special node called the root node –T has two sets of nodes, LT and RT, called the left subtree and right subtree of T, respectively –Key in root node larger than every key in left subtree and smaller than every key in right subtree –LT and RT are binary search trees
Data Structures Using C++25 Binary Search Trees
Data Structures Using C++26 Operations Performed on Binary Search Trees Determine whether the binary search tree is empty Search the binary search tree for a particular item Insert an item in the binary search tree Delete an item from the binary search tree
Data Structures Using C++27 Operations Performed on Binary Search Trees Find the height of the binary search tree Find the number of nodes in the binary search tree Find the number of leaves in the binary search tree Traverse the binary search tree Copy the binary search tree
Data Structures Using C++28 Binary Search Tree Analysis Worst Case: Linear tree
Data Structures Using C++29 Binary Search Tree Analysis Theorem: Let T be a binary search tree with n nodes, where n > 0.The average number of nodes visited in a search of T is approximately 1.39log 2 n Number of comparisons required to determine whether x is in T is one more than the number of comparisons required to insert x in T Number of comparisons required to insert x in T same as the number of comparisons made in unsuccessful search, reflecting that x is not in T
Data Structures Using C++30 Binary Search Tree Analysis It follows that: It is also known that: Solving Equations (11-1) and (11-2)
Data Structures Using C++31 Nonrecursive Inorder Traversal
Data Structures Using C++32 Nonrecursive Inorder Traversal: General Algorithm 1.current = root; //start traversing the binary tree at // the root node 2.while(current is not NULL or stack is nonempty) if(current is not NULL) { push current onto stack; current = current->llink; } else { pop stack into current; visit current; //visit the node current = current->rlink; //move to the //right child }
Data Structures Using C++33 Nonrecursive Preorder Traversal: General Algorithm 1. current = root; //start the traversal at the root node 2. while(current is not NULL or stack is nonempty) if(current is not NULL) { visit current; push current onto stack; current = current->llink; } else { pop stack into current; current = current->rlink; //prepare to visit //the right subtree }
Data Structures Using C++34 Nonrecursive Postorder Traversal 1.current = root; //start traversal at root node 2.v = 0; 3.if(current is NULL) the binary tree is empty 4.if(current is not NULL) a.push current into stack; b.push 1 onto stack; c.current = current->llink; d.while(stack is not empty) if(current is not NULL and v is 0) { push current and 1 onto stack; current = current->llink; }
Data Structures Using C++35 Nonrecursive Postorder Traversal (Continued) else { pop stack into current and v; if(v == 1) { push current and 2 onto stack; current = current->rlink; v = 0; } else visit current; }
Data Structures Using C++36 AVL (Height-balanced Trees) A perfectly balanced binary tree is a binary tree such that: –The height of the left and right subtrees of the root are equal –The left and right subtrees of the root are perfectly balanced binary trees
Data Structures Using C++37 Perfectly Balanced Binary Tree
Data Structures Using C++38 AVL (Height-balanced Trees) An AVL tree (or height-balanced tree) is a binary search tree such that: –The height of the left and right subtrees of the root differ by at most 1 –The left and right subtrees of the root are AVL trees
Data Structures Using C++39 AVL Trees
Data Structures Using C++40 Non-AVL Trees
Data Structures Using C++41 Insertion Into AVL Tree
Data Structures Using C++42 Insertion Into AVL Trees
Data Structures Using C++43 Insertion Into AVL Trees
Data Structures Using C++44 Insertion Into AVL Trees
Data Structures Using C++45 Insertion Into AVL Trees
Data Structures Using C++46 AVL Tree Rotations Reconstruction procedure: rotating tree left rotation and right rotation Suppose that the rotation occurs at node x Left rotation: certain nodes from the right subtree of x move to its left subtree; the root of the right subtree of x becomes the new root of the reconstructed subtree Right rotation at x: certain nodes from the left subtree of x move to its right subtree; the root of the left subtree of x becomes the new root of the reconstructed subtree
Data Structures Using C++47 AVL Tree Rotations
Data Structures Using C++48 AVL Tree Rotations
Data Structures Using C++49 AVL Tree Rotations
Data Structures Using C++50 AVL Tree Rotations
Data Structures Using C++51 AVL Tree Rotations
Data Structures Using C++52 AVL Tree Rotations
Data Structures Using C++53 Deletion From AVL Trees Case 1: the node to be deleted is a leaf Case 2: the node to be deleted has no right child, that is, its right subtree is empty Case 3: the node to be deleted has no left child, that is, its left subtree is empty Case 4: the node to be deleted has a left child and a right child
Data Structures Using C++54 Analysis: AVL Trees Consider all the possible AVL trees of height h. Let T h be an AVL tree of height h such that T h has the fewest number of nodes. Let T hl denote the left subtree of T h and T hr denote the right subtree of T h. Then: where | T h | denotes the number of nodes in T h.
Data Structures Using C++55 Analysis: AVL Trees Suppose that T hl is of height h – 1 and T hr is of height h – 2. T hl is an AVL tree of height h – 1 such that T hl has the fewest number of nodes among all AVL trees of height h – 1. T hr is an AVL tree of height h – 2 that has the fewest number of nodes among all AVL trees of height h – 2. T hl is of the form T h -1 and T hr is of the form T h -2. Hence:
Data Structures Using C++56 Analysis: AVL Trees Let Fh+2 = |Th | + 1. Then: Called a Fibonacci sequence; solution to Fh is given by: Hence From this it can be concluded that
Data Structures Using C++57 Chapter Summary Binary trees Binary search trees Recursive traversal algorithms Nonrecursive traversal algorithms AVL trees