Sletning i et rød-sort træ

Indholdsfortegnelse

Sletning af et element fra et rød-sort træ
Algoritme til opretholdelse af rød-sort ejendom efter sletning
Python, Java og C / C ++ eksempler

I denne vejledning lærer du, hvordan en knude slettes fra et rød-sort træ er. Du finder også arbejdseksempler på sletninger udført på et rød-sort træ i C, C ++, Java og Python.

Rød-sort træ er et selvbalancerende binært søgetræ, hvor hvert knudepunkt indeholder en ekstra bit til at betegne knudens farve, enten rød eller sort.

Før du læser denne artikel, se venligst artiklen om rød-sort træ.

Sletning af en node kan muligvis forstyrre de rød-sorte egenskaber ved et rød-sort træ. Hvis denne handling overtræder de rød-sorte egenskaber, bruges en fikseringsalgoritme til at genvinde de rød-sorte egenskaber.

Sletning af et element fra et rød-sort træ

Denne handling fjerner en node fra træet. Efter sletning af en node opretholdes den rød-sorte egenskab igen.

Lad nodeToBeDeletedvære: Knude, der skal slettes
Gem farven på nodeToBeDeleted i origrinalColor. Gemmer original farve
Hvis det venstre barn til nodeToBeDeleted er NULL
1. Tildel det højre barn til nodeToBeDeleted til x. Tildel x til højreBarn
2. Transplantation nodeToBeDeleted med x. Transplantation nodeToBeDeleted med x
Ellers hvis det rigtige barn til nodeToBeDeleted er NULL
1. Tildel det venstre barn til nodeToBeDeleted til x.
2. Transplantation nodeToBeDeleted med x.
Andet
1. Tildel minimum til højre undertræ af noteToBeDeleted til y.
2. Gem farven på y i originalColor.
3. Tildel højreBarn af y til x.
4. Hvis y er et barn af nodeToBeDeleted, skal du indstille forælderen til x som y.
5. Ellers, transplanter y med højre Child of y.
6. Transplantation nodeToBeDeleted med y.
7. Indstil farven på y med originalColor.
Hvis originalFarven er sort, skal du ringe til DeleteFix (x).

Algoritme til opretholdelse af rød-sort ejendom efter sletning

Denne algoritme implementeres, når en sort node slettes, fordi den overtræder den sort-dybdeegenskab for det rød-sorte træ.

Denne overtrædelse rettes ved at antage, at node x (som indtager y's oprindelige position) har en ekstra sort. Dette gør node x hverken rød eller sort. Det er enten dobbelt sort eller sort-rød. Dette krænker de rød-sorte egenskaber.

Farveegenskaben på x ændres dog ikke, men den ekstra sorte er repræsenteret i x, der peger på noden.

Den ekstra sorte kan fjernes, hvis

Den når rodnoden.
Hvis x peger på en rød-sort node. I dette tilfælde er x farvet sort.
Egnede rotationer og omfarver udføres.

Følgende algoritme bevarer egenskaberne for et rød-sort træ.

Gør følgende, indtil x ikke er roden til træet, og farven på x er sort
Hvis x er det venstre barn af sin forælder,
1. Tildel wtil søskende af x. Tildeling af w
2. Hvis søskende til x er RØD,
  sag I:
  1. Indstil farven på det rigtige barn til forældren til x som SORT.
  2. Indstil farven på forældren til x som RØD. Farveændring
  3. Venstre-roter forælderen til x. Venstre-drej
  4. Tildel retBarn af forælderen til x til w. Tildel igen w
3. Hvis farven på både højre og venstreBarn af w er SORT,
  sag II:
  1. Indstil farven på w som RØD
  2. Tildel forælderen til x til x.
4. Ellers hvis farven på højreBarn af w er SORT
  sag-III:
  1. Indstil farven på venstreBarn af w som SORT
  2. Indstil farven på w som RØD farveændring
  3. Højre-drej m. Drej til højre
  4. Tildel retBarn af forælderen til x til w. Tildel igen w
5. Hvis nogen af ovenstående tilfælde ikke forekommer, skal du gøre følgende.
  Sag IV:
  1. Indstil farven på w som farven på forælderen til x.
  2. Indstil farven på forældren til forældren til x som SORT.
  3. Indstil farven på det rigtige barn af w som SORT. Farveændring
  4. Venstre-roter forælderen til x. Venstre-drej
  5. Indstil x som roden til træet. Indstil x som rod
Ellers det samme som ovenfor med højre ændret til venstre og omvendt.
Indstil farven på x som SORT.

Arbejdsgangen i ovenstående tilfælde kan forstås ved hjælp af nedenstående rutediagram.

Flowchart til sletning

Python, Java og C / C ++ eksempler

Python Java C C ++

 # Implementing Red-Black Tree in Python import sys # Node creation class Node(): def __init__(self, item): self.item = item self.parent = None self.left = None self.right = None self.color = 1 class RedBlackTree(): def __init__(self): self.TNULL = Node(0) self.TNULL.color = 0 self.TNULL.left = None self.TNULL.right = None self.root = self.TNULL # Preorder def pre_order_helper(self, node): if node != TNULL: sys.stdout.write(node.item + " ") self.pre_order_helper(node.left) self.pre_order_helper(node.right) # Inorder def in_order_helper(self, node): if node != TNULL: self.in_order_helper(node.left) sys.stdout.write(node.item + " ") self.in_order_helper(node.right) # Postorder def post_order_helper(self, node): if node != TNULL: self.post_order_helper(node.left) self.post_order_helper(node.right) sys.stdout.write(node.item + " ") # Search the tree def search_tree_helper(self, node, key): if node == TNULL or key == node.item: return node if key < node.item: return self.search_tree_helper(node.left, key) return self.search_tree_helper(node.right, key) # Balancing the tree after deletion def delete_fix(self, x): while x != self.root and x.color == 0: if x == x.parent.left: s = x.parent.right if s.color == 1: s.color = 0 x.parent.color = 1 self.left_rotate(x.parent) s = x.parent.right if s.left.color == 0 and s.right.color == 0: s.color = 1 x = x.parent else: if s.right.color == 0: s.left.color = 0 s.color = 1 self.right_rotate(s) s = x.parent.right s.color = x.parent.color x.parent.color = 0 s.right.color = 0 self.left_rotate(x.parent) x = self.root else: s = x.parent.left if s.color == 1: s.color = 0 x.parent.color = 1 self.right_rotate(x.parent) s = x.parent.left if s.right.color == 0 and s.right.color == 0: s.color = 1 x = x.parent else: if s.left.color == 0: s.right.color = 0 s.color = 1 self.left_rotate(s) s = x.parent.left s.color = x.parent.color x.parent.color = 0 s.left.color = 0 self.right_rotate(x.parent) x = self.root x.color = 0 def __rb_transplant(self, u, v): if u.parent == None: self.root = v elif u == u.parent.left: u.parent.left = v else: u.parent.right = v v.parent = u.parent # Node deletion def delete_node_helper(self, node, key): z = self.TNULL while node != self.TNULL: if node.item == key: z = node if node.item <= key: node = node.right else: node = node.left if z == self.TNULL: print("Cannot find key in the tree") return y = z y_original_color = y.color if z.left == self.TNULL: x = z.right self.__rb_transplant(z, z.right) elif (z.right == self.TNULL): x = z.left self.__rb_transplant(z, z.left) else: y = self.minimum(z.right) y_original_color = y.color x = y.right if y.parent == z: x.parent = y else: self.__rb_transplant(y, y.right) y.right = z.right y.right.parent = y self.__rb_transplant(z, y) y.left = z.left y.left.parent = y y.color = z.color if y_original_color == 0: self.delete_fix(x) # Balance the tree after insertion def fix_insert(self, k): while k.parent.color == 1: if k.parent == k.parent.parent.right: u = k.parent.parent.left if u.color == 1: u.color = 0 k.parent.color = 0 k.parent.parent.color = 1 k = k.parent.parent else: if k == k.parent.left: k = k.parent self.right_rotate(k) k.parent.color = 0 k.parent.parent.color = 1 self.left_rotate(k.parent.parent) else: u = k.parent.parent.right if u.color == 1: u.color = 0 k.parent.color = 0 k.parent.parent.color = 1 k = k.parent.parent else: if k == k.parent.right: k = k.parent self.left_rotate(k) k.parent.color = 0 k.parent.parent.color = 1 self.right_rotate(k.parent.parent) if k == self.root: break self.root.color = 0 # Printing the tree def __print_helper(self, node, indent, last): if node != self.TNULL: sys.stdout.write(indent) if last: sys.stdout.write("R----") indent += " " else: sys.stdout.write("L----") indent += "| " s_color = "RED" if node.color == 1 else "BLACK" print(str(node.item) + "(" + s_color + ")") self.__print_helper(node.left, indent, False) self.__print_helper(node.right, indent, True) def preorder(self): self.pre_order_helper(self.root) def inorder(self): self.in_order_helper(self.root) def postorder(self): self.post_order_helper(self.root) def searchTree(self, k): return self.search_tree_helper(self.root, k) def minimum(self, node): while node.left != self.TNULL: node = node.left return node def maximum(self, node): while node.right != self.TNULL: node = node.right return node def successor(self, x): if x.right != self.TNULL: return self.minimum(x.right) y = x.parent while y != self.TNULL and x == y.right: x = y y = y.parent return y def predecessor(self, x): if (x.left != self.TNULL): return self.maximum(x.left) y = x.parent while y != self.TNULL and x == y.left: x = y y = y.parent return y def left_rotate(self, x): y = x.right x.right = y.left if y.left != self.TNULL: y.left.parent = x y.parent = x.parent if x.parent == None: self.root = y elif x == x.parent.left: x.parent.left = y else: x.parent.right = y y.left = x x.parent = y def right_rotate(self, x): y = x.left x.left = y.right if y.right != self.TNULL: y.right.parent = x y.parent = x.parent if x.parent == None: self.root = y elif x == x.parent.right: x.parent.right = y else: x.parent.left = y y.right = x x.parent = y def insert(self, key): node = Node(key) node.parent = None node.item = key node.left = self.TNULL node.right = self.TNULL node.color = 1 y = None x = self.root while x != self.TNULL: y = x if node.item < x.item: x = x.left else: x = x.right node.parent = y if y == None: self.root = node elif node.item < y.item: y.left = node else: y.right = node if node.parent == None: node.color = 0 return if node.parent.parent == None: return self.fix_insert(node) def get_root(self): return self.root def delete_node(self, item): self.delete_node_helper(self.root, item) def print_tree(self): self.__print_helper(self.root, "", True) if __name__ == "__main__": bst = RedBlackTree() bst.insert(55) bst.insert(40) bst.insert(65) bst.insert(60) bst.insert(75) bst.insert(57) bst.print_tree() print("After deleting an element") bst.delete_node(40) bst.print_tree()

 // Implementing Red-Black Tree in Java class Node ( int data; Node parent; Node left; Node right; int color; ) public class RedBlackTree ( private Node root; private Node TNULL; // Preorder private void preOrderHelper(Node node) ( if (node != TNULL) ( System.out.print(node.data + " "); preOrderHelper(node.left); preOrderHelper(node.right); ) ) // Inorder private void inOrderHelper(Node node) ( if (node != TNULL) ( inOrderHelper(node.left); System.out.print(node.data + " "); inOrderHelper(node.right); ) ) // Post order private void postOrderHelper(Node node) ( if (node != TNULL) ( postOrderHelper(node.left); postOrderHelper(node.right); System.out.print(node.data + " "); ) ) // Search the tree private Node searchTreeHelper(Node node, int key) ( if (node == TNULL || key == node.data) ( return node; ) if (key < node.data) ( return searchTreeHelper(node.left, key); ) return searchTreeHelper(node.right, key); ) // Balance the tree after deletion of a node private void fixDelete(Node x) ( Node s; while (x != root && x.color == 0) ( if (x == x.parent.left) ( s = x.parent.right; if (s.color == 1) ( s.color = 0; x.parent.color = 1; leftRotate(x.parent); s = x.parent.right; ) if (s.left.color == 0 && s.right.color == 0) ( s.color = 1; x = x.parent; ) else ( if (s.right.color == 0) ( s.left.color = 0; s.color = 1; rightRotate(s); s = x.parent.right; ) s.color = x.parent.color; x.parent.color = 0; s.right.color = 0; leftRotate(x.parent); x = root; ) ) else ( s = x.parent.left; if (s.color == 1) ( s.color = 0; x.parent.color = 1; rightRotate(x.parent); s = x.parent.left; ) if (s.right.color == 0 && s.right.color == 0) ( s.color = 1; x = x.parent; ) else ( if (s.left.color == 0) ( s.right.color = 0; s.color = 1; leftRotate(s); s = x.parent.left; ) s.color = x.parent.color; x.parent.color = 0; s.left.color = 0; rightRotate(x.parent); x = root; ) ) ) x.color = 0; ) private void rbTransplant(Node u, Node v) ( if (u.parent == null) ( root = v; ) else if (u == u.parent.left) ( u.parent.left = v; ) else ( u.parent.right = v; ) v.parent = u.parent; ) private void deleteNodeHelper(Node node, int key) ( Node z = TNULL; Node x, y; while (node != TNULL) ( if (node.data == key) ( z = node; ) if (node.data <= key) ( node = node.right; ) else ( node = node.left; ) ) if (z == TNULL) ( System.out.println("Couldn't find key in the tree"); return; ) y = z; int yOriginalColor = y.color; if (z.left == TNULL) ( x = z.right; rbTransplant(z, z.right); ) else if (z.right == TNULL) ( x = z.left; rbTransplant(z, z.left); ) else ( y = minimum(z.right); yOriginalColor = y.color; x = y.right; if (y.parent == z) ( x.parent = y; ) else ( rbTransplant(y, y.right); y.right = z.right; y.right.parent = y; ) rbTransplant(z, y); y.left = z.left; y.left.parent = y; y.color = z.color; ) if (yOriginalColor == 0) ( fixDelete(x); ) ) // Balance the node after insertion private void fixInsert(Node k) ( Node u; while (k.parent.color == 1) ( if (k.parent == k.parent.parent.right) ( u = k.parent.parent.left; if (u.color == 1) ( u.color = 0; k.parent.color = 0; k.parent.parent.color = 1; k = k.parent.parent; ) else ( if (k == k.parent.left) ( k = k.parent; rightRotate(k); ) k.parent.color = 0; k.parent.parent.color = 1; leftRotate(k.parent.parent); ) ) else ( u = k.parent.parent.right; if (u.color == 1) ( u.color = 0; k.parent.color = 0; k.parent.parent.color = 1; k = k.parent.parent; ) else ( if (k == k.parent.right) ( k = k.parent; leftRotate(k); ) k.parent.color = 0; k.parent.parent.color = 1; rightRotate(k.parent.parent); ) ) if (k == root) ( break; ) ) root.color = 0; ) private void printHelper(Node root, String indent, boolean last) ( if (root != TNULL) ( System.out.print(indent); if (last) ( System.out.print("R----"); indent += " "; ) else ( System.out.print("L----"); indent += "| "; ) String sColor = root.color == 1 ? "RED" : "BLACK"; System.out.println(root.data + "(" + sColor + ")"); printHelper(root.left, indent, false); printHelper(root.right, indent, true); ) ) public RedBlackTree() ( TNULL = new Node(); TNULL.color = 0; TNULL.left = null; TNULL.right = null; root = TNULL; ) public void preorder() ( preOrderHelper(this.root); ) public void inorder() ( inOrderHelper(this.root); ) public void postorder() ( postOrderHelper(this.root); ) public Node searchTree(int k) ( return searchTreeHelper(this.root, k); ) public Node minimum(Node node) ( while (node.left != TNULL) ( node = node.left; ) return node; ) public Node maximum(Node node) ( while (node.right != TNULL) ( node = node.right; ) return node; ) public Node successor(Node x) ( if (x.right != TNULL) ( return minimum(x.right); ) Node y = x.parent; while (y != TNULL && x == y.right) ( x = y; y = y.parent; ) return y; ) public Node predecessor(Node x) ( if (x.left != TNULL) ( return maximum(x.left); ) Node y = x.parent; while (y != TNULL && x == y.left) ( x = y; y = y.parent; ) return y; ) public void leftRotate(Node x) ( Node y = x.right; x.right = y.left; if (y.left != TNULL) ( y.left.parent = x; ) y.parent = x.parent; if (x.parent == null) ( this.root = y; ) else if (x == x.parent.left) ( x.parent.left = y; ) else ( x.parent.right = y; ) y.left = x; x.parent = y; ) public void rightRotate(Node x) ( Node y = x.left; x.left = y.right; if (y.right != TNULL) ( y.right.parent = x; ) y.parent = x.parent; if (x.parent == null) ( this.root = y; ) else if (x == x.parent.right) ( x.parent.right = y; ) else ( x.parent.left = y; ) y.right = x; x.parent = y; ) public void insert(int key) ( Node node = new Node(); node.parent = null; node.data = key; node.left = TNULL; node.right = TNULL; node.color = 1; Node y = null; Node x = this.root; while (x != TNULL) ( y = x; if (node.data < x.data) ( x = x.left; ) else ( x = x.right; ) ) node.parent = y; if (y == null) ( root = node; ) else if (node.data < y.data) ( y.left = node; ) else ( y.right = node; ) if (node.parent == null) ( node.color = 0; return; ) if (node.parent.parent == null) ( return; ) fixInsert(node); ) public Node getRoot() ( return this.root; ) public void deleteNode(int data) ( deleteNodeHelper(this.root, data); ) public void printTree() ( printHelper(this.root, "", true); ) public static void main(String() args) ( RedBlackTree bst = new RedBlackTree(); bst.insert(55); bst.insert(40); bst.insert(65); bst.insert(60); bst.insert(75); bst.insert(57); bst.printTree(); System.out.println("After deleting:"); bst.deleteNode(40); bst.printTree(); ) )

 // Implementing Red-Black Tree in C #include #include enum nodeColor ( RED, BLACK ); struct rbNode ( int data, color; struct rbNode *link(2); ); struct rbNode *root = NULL; // Create a red-black tree struct rbNode *createNode(int data) ( struct rbNode *newnode; newnode = (struct rbNode *)malloc(sizeof(struct rbNode)); newnode->data = data; newnode->color = RED; newnode->link(0) = newnode->link(1) = NULL; return newnode; ) // Insert an node void insertion(int data) ( struct rbNode *stack(98), *ptr, *newnode, *xPtr, *yPtr; int dir(98), ht = 0, index; ptr = root; if (!root) ( root = createNode(data); return; ) stack(ht) = root; dir(ht++) = 0; while (ptr != NULL) ( if (ptr->data == data) ( printf("Duplicates Not Allowed!!"); return; ) index = (data - ptr->data)> 0 ? 1 : 0; stack(ht) = ptr; ptr = ptr->link(index); dir(ht++) = index; ) stack(ht - 1)->link(index) = newnode = createNode(data); while ((ht>= 3) && (stack(ht - 1)->color == RED)) ( if (dir(ht - 2) == 0) ( yPtr = stack(ht - 2)->link(1); if (yPtr != NULL && yPtr->color == RED) ( stack(ht - 2)->color = RED; stack(ht - 1)->color = yPtr->color = BLACK; ht = ht - 2; ) else ( if (dir(ht - 1) == 0) ( yPtr = stack(ht - 1); ) else ( xPtr = stack(ht - 1); yPtr = xPtr->link(1); xPtr->link(1) = yPtr->link(0); yPtr->link(0) = xPtr; stack(ht - 2)->link(0) = yPtr; ) xPtr = stack(ht - 2); xPtr->color = RED; yPtr->color = BLACK; xPtr->link(0) = yPtr->link(1); yPtr->link(1) = xPtr; if (xPtr == root) ( root = yPtr; ) else ( stack(ht - 3)->link(dir(ht - 3)) = yPtr; ) break; ) ) else ( yPtr = stack(ht - 2)->link(0); if ((yPtr != NULL) && (yPtr->color == RED)) ( stack(ht - 2)->color = RED; stack(ht - 1)->color = yPtr->color = BLACK; ht = ht - 2; ) else ( if (dir(ht - 1) == 1) ( yPtr = stack(ht - 1); ) else ( xPtr = stack(ht - 1); yPtr = xPtr->link(0); xPtr->link(0) = yPtr->link(1); yPtr->link(1) = xPtr; stack(ht - 2)->link(1) = yPtr; ) xPtr = stack(ht - 2); yPtr->color = BLACK; xPtr->color = RED; xPtr->link(1) = yPtr->link(0); yPtr->link(0) = xPtr; if (xPtr == root) ( root = yPtr; ) else ( stack(ht - 3)->link(dir(ht - 3)) = yPtr; ) break; ) ) ) root->color = BLACK; ) // Delete a node void deletion(int data) ( struct rbNode *stack(98), *ptr, *xPtr, *yPtr; struct rbNode *pPtr, *qPtr, *rPtr; int dir(98), ht = 0, diff, i; enum nodeColor color; if (!root) ( printf("Tree not available"); return; ) ptr = root; while (ptr != NULL) ( if ((data - ptr->data) == 0) break; diff = (data - ptr->data)> 0 ? 1 : 0; stack(ht) = ptr; dir(ht++) = diff; ptr = ptr->link(diff); ) if (ptr->link(1) == NULL) ( if ((ptr == root) && (ptr->link(0) == NULL)) ( free(ptr); root = NULL; ) else if (ptr == root) ( root = ptr->link(0); free(ptr); ) else ( stack(ht - 1)->link(dir(ht - 1)) = ptr->link(0); ) ) else ( xPtr = ptr->link(1); if (xPtr->link(0) == NULL) ( xPtr->link(0) = ptr->link(0); color = xPtr->color; xPtr->color = ptr->color; ptr->color = color; if (ptr == root) ( root = xPtr; ) else ( stack(ht - 1)->link(dir(ht - 1)) = xPtr; ) dir(ht) = 1; stack(ht++) = xPtr; ) else ( i = ht++; while (1) ( dir(ht) = 0; stack(ht++) = xPtr; yPtr = xPtr->link(0); if (!yPtr->link(0)) break; xPtr = yPtr; ) dir(i) = 1; stack(i) = yPtr; if (i> 0) stack(i - 1)->link(dir(i - 1)) = yPtr; yPtr->link(0) = ptr->link(0); xPtr->link(0) = yPtr->link(1); yPtr->link(1) = ptr->link(1); if (ptr == root) ( root = yPtr; ) color = yPtr->color; yPtr->color = ptr->color; ptr->color = color; ) ) if (ht color == BLACK) ( while (1) ( pPtr = stack(ht - 1)->link(dir(ht - 1)); if (pPtr && pPtr->color == RED) ( pPtr->color = BLACK; break; ) if (ht link(1); if (!rPtr) break; if (rPtr->color == RED) ( stack(ht - 1)->color = RED; rPtr->color = BLACK; stack(ht - 1)->link(1) = rPtr->link(0); rPtr->link(0) = stack(ht - 1); if (stack(ht - 1) == root) ( root = rPtr; ) else ( stack(ht - 2)->link(dir(ht - 2)) = rPtr; ) dir(ht) = 0; stack(ht) = stack(ht - 1); stack(ht - 1) = rPtr; ht++; rPtr = stack(ht - 1)->link(1); ) if ((!rPtr->link(0) || rPtr->link(0)->color == BLACK) && (!rPtr->link(1) || rPtr->link(1)->color == BLACK)) ( rPtr->color = RED; ) else ( if (!rPtr->link(1) || rPtr->link(1)->color == BLACK) ( qPtr = rPtr->link(0); rPtr->color = RED; qPtr->color = BLACK; rPtr->link(0) = qPtr->link(1); qPtr->link(1) = rPtr; rPtr = stack(ht - 1)->link(1) = qPtr; ) rPtr->color = stack(ht - 1)->color; stack(ht - 1)->color = BLACK; rPtr->link(1)->color = BLACK; stack(ht - 1)->link(1) = rPtr->link(0); rPtr->link(0) = stack(ht - 1); if (stack(ht - 1) == root) ( root = rPtr; ) else ( stack(ht - 2)->link(dir(ht - 2)) = rPtr; ) break; ) ) else ( rPtr = stack(ht - 1)->link(0); if (!rPtr) break; if (rPtr->color == RED) ( stack(ht - 1)->color = RED; rPtr->color = BLACK; stack(ht - 1)->link(0) = rPtr->link(1); rPtr->link(1) = stack(ht - 1); if (stack(ht - 1) == root) ( root = rPtr; ) else ( stack(ht - 2)->link(dir(ht - 2)) = rPtr; ) dir(ht) = 1; stack(ht) = stack(ht - 1); stack(ht - 1) = rPtr; ht++; rPtr = stack(ht - 1)->link(0); ) if ((!rPtr->link(0) || rPtr->link(0)->color == BLACK) && (!rPtr->link(1) || rPtr->link(1)->color == BLACK)) ( rPtr->color = RED; ) else ( if (!rPtr->link(0) || rPtr->link(0)->color == BLACK) ( qPtr = rPtr->link(1); rPtr->color = RED; qPtr->color = BLACK; rPtr->link(1) = qPtr->link(0); qPtr->link(0) = rPtr; rPtr = stack(ht - 1)->link(0) = qPtr; ) rPtr->color = stack(ht - 1)->color; stack(ht - 1)->color = BLACK; rPtr->link(0)->color = BLACK; stack(ht - 1)->link(0) = rPtr->link(1); rPtr->link(1) = stack(ht - 1); if (stack(ht - 1) == root) ( root = rPtr; ) else ( stack(ht - 2)->link(dir(ht - 2)) = rPtr; ) break; ) ) ht--; ) ) ) // Print the inorder traversal of the tree void inorderTraversal(struct rbNode *node) ( if (node) ( inorderTraversal(node->link(0)); printf("%d ", node->data); inorderTraversal(node->link(1)); ) return; ) // Driver code int main() ( int ch, data; while (1) ( printf("1. Insertion 2. Deletion"); printf("3. Traverse 4. Exit"); printf("Enter your choice:"); scanf("%d", &ch); switch (ch) ( case 1: printf("Enter the element to insert:"); scanf("%d", &data); insertion(data); break; case 2: printf("Enter the element to delete:"); scanf("%d", &data); deletion(data); break; case 3: inorderTraversal(root); printf(""); break; case 4: exit(0); default: printf("Not available"); break; ) printf(""); ) return 0; )

 // Implementing Red-Black Tree in C++ #include using namespace std; struct Node ( int data; Node *parent; Node *left; Node *right; int color; ); typedef Node *NodePtr; class RedBlackTree ( private: NodePtr root; NodePtr TNULL; void initializeNULLNode(NodePtr node, NodePtr parent) ( node->data = 0; node->parent = parent; node->left = nullptr; node->right = nullptr; node->color = 0; ) // Preorder void preOrderHelper(NodePtr node) ( if (node != TNULL) ( cout right); ) ) // Inorder void inOrderHelper(NodePtr node) ( if (node != TNULL) ( inOrderHelper(node->left); cout left); postOrderHelper(node->right); cout left, key); ) return searchTreeHelper(node->right, key); ) // For balancing the tree after deletion void deleteFix(NodePtr x) ( NodePtr s; while (x != root && x->color == 0) ( if (x == x->parent->left) ( s = x->parent->right; if (s->color == 1) ( s->color = 0; x->parent->color = 1; leftRotate(x->parent); s = x->parent->right; ) if (s->left->color == 0 && s->right->color == 0) ( s->color = 1; x = x->parent; ) else ( if (s->right->color == 0) ( s->left->color = 0; s->color = 1; rightRotate(s); s = x->parent->right; ) s->color = x->parent->color; x->parent->color = 0; s->right->color = 0; leftRotate(x->parent); x = root; ) ) else ( s = x->parent->left; if (s->color == 1) ( s->color = 0; x->parent->color = 1; rightRotate(x->parent); s = x->parent->left; ) if (s->right->color == 0 && s->right->color == 0) ( s->color = 1; x = x->parent; ) else ( if (s->left->color == 0) ( s->right->color = 0; s->color = 1; leftRotate(s); s = x->parent->left; ) s->color = x->parent->color; x->parent->color = 0; s->left->color = 0; rightRotate(x->parent); x = root; ) ) ) x->color = 0; ) void rbTransplant(NodePtr u, NodePtr v) ( if (u->parent == nullptr) ( root = v; ) else if (u == u->parent->left) ( u->parent->left = v; ) else ( u->parent->right = v; ) v->parent = u->parent; ) void deleteNodeHelper(NodePtr node, int key) ( NodePtr z = TNULL; NodePtr x, y; while (node != TNULL) ( if (node->data == key) ( z = node; ) if (node->data right; ) else ( node = node->left; ) ) if (z == TNULL) ( cout << "Key not found in the tree"  left == TNULL) ( x = z->right; rbTransplant(z, z->right); ) else if (z->right == TNULL) ( x = z->left; rbTransplant(z, z->left); ) else ( y = minimum(z->right); y_original_color = y->color; x = y->right; if (y->parent == z) ( x->parent = y; ) else ( rbTransplant(y, y->right); y->right = z->right; y->right->parent = y; ) rbTransplant(z, y); y->left = z->left; y->left->parent = y; y->color = z->color; ) delete z; if (y_original_color == 0) ( deleteFix(x); ) ) // For balancing the tree after insertion void insertFix(NodePtr k) ( NodePtr u; while (k->parent->color == 1) ( if (k->parent == k->parent->parent->right) ( u = k->parent->parent->left; if (u->color == 1) ( u->color = 0; k->parent->color = 0; k->parent->parent->color = 1; k = k->parent->parent; ) else ( if (k == k->parent->left) ( k = k->parent; rightRotate(k); ) k->parent->color = 0; k->parent->parent->color = 1; leftRotate(k->parent->parent); ) ) else ( u = k->parent->parent->right; if (u->color == 1) ( u->color = 0; k->parent->color = 0; k->parent->parent->color = 1; k = k->parent->parent; ) else ( if (k == k->parent->right) ( k = k->parent; leftRotate(k); ) k->parent->color = 0; k->parent->parent->color = 1; rightRotate(k->parent->parent); ) ) if (k == root) ( break; ) ) root->color = 0; ) void printHelper(NodePtr root, string indent, bool last) ( if (root != TNULL) ( cout << indent; if (last) ( cout << "R----"; indent += " "; ) else ( cout  right, indent, true); ) ) public: RedBlackTree() ( TNULL = new Node; TNULL->color = 0; TNULL->left = nullptr; TNULL->right = nullptr; root = TNULL; ) void preorder() ( preOrderHelper(this->root); ) void inorder() ( inOrderHelper(this->root); ) void postorder() ( postOrderHelper(this->root); ) NodePtr searchTree(int k) ( return searchTreeHelper(this->root, k); ) NodePtr minimum(NodePtr node) ( while (node->left != TNULL) ( node = node->left; ) return node; ) NodePtr maximum(NodePtr node) ( while (node->right != TNULL) ( node = node->right; ) return node; ) NodePtr successor(NodePtr x) ( if (x->right != TNULL) ( return minimum(x->right); ) NodePtr y = x->parent; while (y != TNULL && x == y->right) ( x = y; y = y->parent; ) return y; ) NodePtr predecessor(NodePtr x) ( if (x->left != TNULL) ( return maximum(x->left); ) NodePtr y = x->parent; while (y != TNULL && x == y->left) ( x = y; y = y->parent; ) return y; ) void leftRotate(NodePtr x) ( NodePtr y = x->right; x->right = y->left; if (y->left != TNULL) ( y->left->parent = x; ) y->parent = x->parent; if (x->parent == nullptr) ( this->root = y; ) else if (x == x->parent->left) ( x->parent->left = y; ) else ( x->parent->right = y; ) y->left = x; x->parent = y; ) void rightRotate(NodePtr x) ( NodePtr y = x->left; x->left = y->right; if (y->right != TNULL) ( y->right->parent = x; ) y->parent = x->parent; if (x->parent == nullptr) ( this->root = y; ) else if (x == x->parent->right) ( x->parent->right = y; ) else ( x->parent->left = y; ) y->right = x; x->parent = y; ) // Inserting a node void insert(int key) ( NodePtr node = new Node; node->parent = nullptr; node->data = key; node->left = TNULL; node->right = TNULL; node->color = 1; NodePtr y = nullptr; NodePtr x = this->root; while (x != TNULL) ( y = x; if (node->data data) ( x = x->left; ) else ( x = x->right; ) ) node->parent = y; if (y == nullptr) ( root = node; ) else if (node->data data) ( y->left = node; ) else ( y->right = node; ) if (node->parent == nullptr) ( node->color = 0; return; ) if (node->parent->parent == nullptr) ( return; ) insertFix(node); ) NodePtr getRoot() ( return this->root; ) void deleteNode(int data) ( deleteNodeHelper(this->root, data); ) void printTree() ( if (root) ( printHelper(this->root, "", true); ) ) ); int main() ( RedBlackTree bst; bst.insert(55); bst.insert(40); bst.insert(65); bst.insert(60); bst.insert(75); bst.insert(57); bst.printTree(); cout << endl << "After deleting" << endl; bst.deleteNode(40); bst.printTree(); )