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AVL Search Trees

AVL Search Trees. Inserting in an AVL tree Insertion implementation Deleting from an AVL tree. Insertion. Insert using a BST insertion algorithm. Rebalance the tree if an imbalance occurs. An imbalance occurs if a node's balance factor changes from -1 to -2 or from+1 to +2.

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AVL Search Trees

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  1. AVL Search Trees • Inserting in an AVL tree • Insertion implementation • Deleting from an AVL tree

  2. Insertion • Insert using a BST insertion algorithm. • Rebalance the tree if an imbalance occurs. • An imbalance occurs if a node's balance factor changes from -1 to -2 or from+1 to +2. • Rebalancing is done at the deepest or lowest unbalanced ancestor of the inserted node. • There are three insertion cases: • Insertion that does not cause an imbalance. • Insertion that causes an imbalance. • Requires a single rotation to rebalance. • Opposite side insertion that causes an imbalance. • Requires a double rotation to rebalance.

  3. Insertion: case 1 • Example: An insertion that does not cause an imbalance. Insert 14

  4. -2 -1 Insertion: case 2 • Case 2a: The lowest node (with a balance factor of -2) had a taller left-subtree and the insertion was on the left-subtree of its left child. • Requires single right rotation to rebalance. right rotation, with node 10 as pivot Insert 3

  5. +2 +1 Insertion: case 2 (contd.) • Case 2b: The lowest node (with a balance factor of +2) had a taller right-subtree and the insertion was on the right-subtree of its right child. • Requires single left rotation to rebalance. left rotation, with node 30 as the pivot Insert 45

  6. +1 -2 Insertion: case 3 • Case 3a: The lowest node (with a balance factor of -2) had a taller left-subtree and the insertion was on the right-subtree of its left child. • Requires a double left-right rotation to rebalance. Insert 7 left rotation, with node 5 as the pivot right rotation, with node 10 as the pivot

  7. +2 -1 Insertion: case 3 (contd.) • Case 3b: The lowest node (with a balance factor of +2) had a taller right-subtree and the insertion was on the left-subtree of its right child. • Requires a double right-left rotation to rebalance. Insert 15 right rotation, with node 16 as the pivot left rotation, with node 9 as the pivot

  8. -2 -2 +2 -1 +1 +1 AVL Rotation Summary +2 -1 Single right rotation Double left-right rotation Single left rotation Double right-left rotation

  9. Insertion Implementation • The insert method of the AVLTree class is: 1 public void insert(MyComparable comparable){ 2 super.insert(comparable); 3 balance(); • } • Recall that the insert method of the BinarySearchTree class is: • public void insert (MyComparable comparable) • { 3 if(isEmpty()) 4 attachKey(comparable); 5 else 6 { 7 MyComparable key = (MyComparable) getKey(); 8 if(comparable.isEQ(key)) 9 throw new IllegalArgumentException("duplicate key" ); 10 else if(comparable.isLT(key)) 11 getLeftBST().insert(comparable); 12 else 13 getRightBST().insert(comparable); 14 } 15 }

  10. Insertion Implementation (contd.) • The AVLTree class overrides the attachKey method of the BinarySearchTree class: 1 public void attachKey(Object object) 2 { 3 if( ! isEmpty()) 4 throw new InvalidOperationException(); 5 key = object; 6 left = new AVLTree(); 7 right = new AVLTree(); 8 height = 0; 9 }

  11. Insertion Implementation (contd.) • protected void balance() • { 3 adjustHeight(); 4 int balanceFactor = getBalanceFactor(); 5 if(balanceFactor == -2) 6 { 7 if(getLeftAVL().getBalanceFactor() < 0) 8 rotateRight(); 9 else 10 rotateLeftRight(); 11 } 12 else if(balanceFactor == 2) 13 { 14 if(getRightAVL().getBalanceFactor() > 0) 15 rotateLeft(); 16 else 17 rotateRightLeft(); 18 } 19 }

  12. Deletion • Delete by a BST deletion by copying algorithm. • Rebalance the tree if an imbalance occurs. • There are three deletion cases: • Deletion that does not cause an imbalance. • Deletion that requires a single rotation to rebalance. • Deletion that requires two or more rotations to rebalance. • Deletion case 1 example: Delete 14

  13. Deletion: case 2 examples Delete 40 right rotation, with node 35 as the pivot

  14. Deletion: case 2 examples (contd.) Delete 32 left rotation, with node 44 as the pivot

  15. 0 Deletion: case 3 examples Delete 40 right rotation, with node 35 as the pivot right rotation, with node 30 as the pivot

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