În acest tutorial, veți afla despre un arbore binar echilibrat și diferitele sale tipuri. De asemenea, veți găsi exemple de lucru ale unui arbore binar echilibrat în C, C ++, Java și Python.
Un copac binar echilibrat, denumit și copac binar echilibrat în înălțime, este definit ca un copac binar în care înălțimea subarborelui stâng și drept al oricărui nod diferă cu cel mult 1.
Pentru a afla mai multe despre înălțimea unui arbore / nod, accesați Structura datelor arborelui. Următoarele sunt condițiile pentru un arbore binar echilibrat în înălțime:
- diferența dintre subarborele stâng și dreapta pentru orice nod nu este mai mult de unul
- subarborele stâng este echilibrat
- subarborele potrivit este echilibrat
Arborele binar echilibrat cu adâncime la fiecare nivel 
Arborele binar echilibrat cu adâncimea la fiecare nivel
Exemple Python, Java și C / C ++
Următorul cod servește la verificarea dacă un copac este echilibrat în înălțime.
Python Java C C ++ # Checking if a binary tree is CalculateHeight balanced in Python # CreateNode creation class CreateNode: def __init__(self, item): self.item = item self.left = self.right = None # Calculate height class CalculateHeight: def __init__(self): self.CalculateHeight = 0 # Check height balance def is_height_balanced(root, CalculateHeight): left_height = CalculateHeight() right_height = CalculateHeight() if root is None: return True l = is_height_balanced(root.left, left_height) r = is_height_balanced(root.right, right_height) CalculateHeight.CalculateHeight = max( left_height.CalculateHeight, right_height.CalculateHeight) + 1 if abs(left_height.CalculateHeight - right_height.CalculateHeight) <= 1: return l and r return False CalculateHeight = CalculateHeight() root = CreateNode(1) root.left = CreateNode(2) root.right = CreateNode(3) root.left.left = CreateNode(4) root.left.right = CreateNode(5) if is_height_balanced(root, CalculateHeight): print('The tree is balanced') else: print('The tree is not balanced')
// Checking if a binary tree is height balanced in Java // Node creation class Node ( int data; Node left, right; Node(int d) ( data = d; left = right = null; ) ) // Calculate height class Height ( int height = 0; ) class BinaryTree ( Node root; // Check height balance boolean checkHeightBalance(Node root, Height height) ( // Check for emptiness if (root == null) ( height.height = 0; return true; ) Height leftHeighteight = new Height(), rightHeighteight = new Height(); boolean l = checkHeightBalance(root.left, leftHeighteight); boolean r = checkHeightBalance(root.right, rightHeighteight); int leftHeight = leftHeighteight.height, rightHeight = rightHeighteight.height; height.height = (leftHeight> rightHeight ? leftHeight : rightHeight) + 1; if ((leftHeight - rightHeight>= 2) || (rightHeight - leftHeight>= 2)) return false; else return l && r; ) public static void main(String args()) ( Height height = new Height(); BinaryTree tree = new BinaryTree(); tree.root = new Node(1); tree.root.left = new Node(2); tree.root.right = new Node(3); tree.root.left.left = new Node(4); tree.root.left.right = new Node(5); if (tree.checkHeightBalance(tree.root, height)) System.out.println("The tree is balanced"); else System.out.println("The tree is not balanced"); ) )
// Checking if a binary tree is height balanced in C #include #include #define bool int // Node creation struct node ( int item; struct node *left; struct node *right; ); // Create a new node struct node *newNode(int item) ( struct node *node = (struct node *)malloc(sizeof(struct node)); node->item = item; node->left = NULL; node->right = NULL; return (node); ) // Check for height balance bool checkHeightBalance(struct node *root, int *height) ( // Check for emptiness int leftHeight = 0, rightHeight = 0; int l = 0, r = 0; if (root == NULL) ( *height = 0; return 1; ) l = checkHeightBalance(root->left, &leftHeight); r = checkHeightBalance(root->right, &rightHeight); *height = (leftHeight> rightHeight ? leftHeight : rightHeight) + 1; if ((leftHeight - rightHeight>= 2) || (rightHeight - leftHeight>= 2)) return 0; else return l && r; ) int main() ( int height = 0; struct node *root = newNode(1); root->left = newNode(2); root->right = newNode(3); root->left->left = newNode(4); root->left->right = newNode(5); if (checkHeightBalance(root, &height)) printf("The tree is balanced"); else printf("The tree is not balanced"); )
// Checking if a binary tree is height balanced in C++ #include using namespace std; #define bool int class node ( public: int item; node *left; node *right; ); // Create anew node node *newNode(int item) ( node *Node = new node(); Node->item = item; Node->left = NULL; Node->right = NULL; return (Node); ) // Check height balance bool checkHeightBalance(node *root, int *height) ( // Check for emptiness int leftHeight = 0, rightHeight = 0; int l = 0, r = 0; if (root == NULL) ( *height = 0; return 1; ) l = checkHeightBalance(root->left, &leftHeight); r = checkHeightBalance(root->right, &rightHeight); *height = (leftHeight> rightHeight ? leftHeight : rightHeight) + 1; if ((leftHeight - rightHeight>= 2) || (rightHeight - leftHeight>= 2)) return 0; else return l && r; ) int main() ( int height = 0; node *root = newNode(1); root->left = newNode(2); root->right = newNode(3); root->left->left = newNode(4); root->left->right = newNode(5); if (checkHeightBalance(root, &height)) cout << "The tree is balanced"; else cout << "The tree is not balanced"; )
Aplicații arborescente binare echilibrate
- Copac AVL
- Arborele de căutare binar echilibrat
