ANTENATO COMUNE PIÙ BASSO IN UN ALBERO BINARIO - TECHCODEVIEW.COM

Qual è l'antenato comune più basso nell'albero binario?

IL antenato comune più basso è il nodo più basso nell'albero che ha sia n1 che n2 come discendenti, dove n1 e n2 sono i nodi per i quali vogliamo trovare la LCA. Quindi, la LCA di un albero binario con i nodi n1 e n2 è l'antenato condiviso di n1 e n2 che si trova più lontano dalla radice.

Applicazione dell'antenato comune più basso (LCA):

Per determinare la distanza tra coppie di nodi in un albero: la distanza da n1 a n2 può essere calcolata come la distanza dalla radice a n1, più la distanza dalla radice a n2, meno il doppio della distanza dalla radice al loro minimo comune antenato.

Antenato comune più basso nell'albero binario

Pratica consigliata Antenato comune più basso in un albero binario Provalo!

Antenato comune più basso in un albero binario memorizzando i percorsi dalla radice a n1 e dalla radice a n2:

L'idea di questo approccio è memorizzare il percorso dalla radice a n1 e dalla radice a n2 in due strutture dati separate. Quindi esamina simultaneamente i valori memorizzati nella struttura dati e cerca la prima mancata corrispondenza.

Illustrazione:

Trova l'LCA di 5 e 6

Percorso dalla radice a 5 = { 1, 2, 5 }
Percorso dalla radice a 6 = { 1, 3, 6 }

Iniziamo a controllare da 0 indice. Poiché entrambi i valori corrispondono (pathA[0] = pathB[0]), passiamo all'indice successivo.

percorsoA[1] non è uguale a percorsoB[1], c'è una mancata corrispondenza quindi consideriamo il valore precedente.

Pertanto la LCA di (5,6) = 1

Seguire i passaggi seguenti per risolvere il problema:

Trova un percorso dalla radice a n1 e memorizzalo in un vettore o array.
Trova un percorso dalla radice a n2 e memorizzalo in un altro vettore o array.
Attraversa entrambi i percorsi finché i valori negli array non sono gli stessi. Restituisce l'elemento comune appena prima della mancata corrispondenza.

Di seguito è riportata l'implementazione dell'algoritmo di cui sopra:

C++

// C++ Program for Lowest Common Ancestor> // in a Binary Tree> // A O(n) solution to find LCA> // of two given values n1 and n2> #include> using> namespace> std;> // A Binary Tree node> struct> Node {> >int> key;> >struct> Node *left, *right;> };> // Utility function creates a new binary tree node with> // given key> Node* newNode(>int> k)> {> >Node* temp =>new> Node;> >temp->chiave = k;> >temp->sinistra = temp->destra = NULL;> >return> temp;> }> // Finds the path from root node to given root of the tree,> // Stores the path in a vector path[], returns true if path> // exists otherwise false> bool> findPath(Node* root, vector<>int>>& percorso,>int> k)> (root->right && findPath(root->right, path, k)))> >return> true>;> >// If not present in subtree rooted with root, remove> >// root from path[] and return false> >path.pop_back();> >return> false>;> > // Returns LCA if node n1, n2 are present in the given> // binary tree, otherwise return -1> int> findLCA(Node* root,>int> n1,>int> n2)> > // Driver program to test above functions> int> main()> {> >// Let us create the Binary Tree shown in above diagram.> >Node* root = newNode(1);> >root->sinistra = nuovoNodo(2);> >root->destra = nuovoNodo(3);> >root->sinistra->sinistra = nuovoNodo(4);> >root->sinistra->destra = nuovoNodo(5);> >root->destra->sinistra = nuovoNodo(6);> >root->destra->destra = nuovoNodo(7);> >cout <<>'LCA(4, 5) = '> << findLCA(root, 4, 5);> >cout <<>

'
LCA(4, 6) = '>

<< findLCA(root, 4, 6);> >cout <<>

'
LCA(3, 4) = '>

<< findLCA(root, 3, 4);> >cout <<>

'
LCA(2, 4) = '>

<< findLCA(root, 2, 4);> >return> 0;> }>

Giava

// Java Program for Lowest Common Ancestor> // in a Binary Tree> // A O(n) solution to find LCA of> // two given values n1 and n2> import> java.util.ArrayList;> import> java.util.List;> // A Binary Tree node> class> Node {> >int> data;> >Node left, right;> >Node(>int> value)> >{> >data = value;> >left = right =>null>;> >}> }> public> class> BT_NoParentPtr_Solution1 {> >Node root;> >private> List path1 =>new> ArrayList();> >private> List path2 =>new> ArrayList();> >// Finds the path from root node to given root of the> >// tree.> >int> findLCA(>int> n1,>int> n2)> >{> >path1.clear();> >path2.clear();> >return> findLCAInternal(root, n1, n2);> >}> >private> int> findLCAInternal(Node root,>int> n1,>int> n2)> >{> >if> (!findPath(root, n1, path1)> >|| !findPath(root, n2, path2)) {> >System.out.println((path1.size()>>0>)> >?>'n1 is present'> >:>'n1 is missing'>);> >System.out.println((path2.size()>>0>)> >?>'n2 is present'> >:>'n2 is missing'>);> >return> ->1>;> >}> >int> i;> >for> (i =>0>

; i   i++) {  // System.out.println(path1.get(i) + ' ' +  // path2.get(i));  if (!path1.get(i).equals(path2.get(i)))  break;  }  return path1.get(i - 1);  }  // Finds the path from root node to given root of the  // tree, Stores the path in a vector path[], returns  // true if path exists otherwise false  private boolean findPath(Node root, int n,  List path)  {  // base case  if (root == null) {  return false;  }  // Store this node . The node will be removed if  // not in path from root to n.  path.add(root.data);  if (root.data == n ||  findPath(root.left, n, path) ||  findPath(root.right, n, path)) {  return true;  }  // If not present in subtree rooted with root,  // remove root from path[] and return false  path.remove(path.size() - 1);  return false;  }  // Driver code  public static void main(String[] args)  {  BT_NoParentPtr_Solution1 tree  = new BT_NoParentPtr_Solution1();  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);  tree.root.right.left = new Node(6);  tree.root.right.right = new Node(7);  System.out.println('LCA(4, 5) = '  + tree.findLCA(4, 5));  System.out.println('LCA(4, 6) = '  + tree.findLCA(4, 6));  System.out.println('LCA(3, 4) = '  + tree.findLCA(3, 4));  System.out.println('LCA(2, 4) = '  + tree.findLCA(2, 4));  } } // This code is contributed by Sreenivasulu Rayanki.>

Python3

# Python Program for Lowest Common Ancestor in a Binary Tree> # O(n) solution to find LCS of two given values n1 and n2> # A binary tree node> class> Node:> ># Constructor to create a new binary node> >def> __init__(>self>, key):> >self>.key>=> key> >self>.left>=> None> >self>.right>=> None> # Finds the path from root node to given root of the tree.> # Stores the path in a list path[], returns true if path> # exists otherwise false> def> findPath(root, path, k):> ># Baes Case> >if> root>is> None>:> >return> False> ># Store this node is path vector. The node will be> ># removed if not in path from root to k> >path.append(root.key)> ># See if the k is same as root's key> >if> root.key>=>=> k:> >return> True> ># Check if k is found in left or right sub-tree> >if> ((root.left !>=> None> and> findPath(root.left, path, k))>or> >(root.right !>=> None> and> findPath(root.right, path, k))):> >return> True> ># If not present in subtree rooted with root, remove> ># root from path and return False> >path.pop()> >return> False> # Returns LCA if node n1 , n2 are present in the given> # binary tree otherwise return -1> def> findLCA(root, n1, n2):> ># To store paths to n1 and n2 fromthe root> >path1>=> []> >path2>=> []> ># Find paths from root to n1 and root to n2.> ># If either n1 or n2 is not present , return -1> >if> (>not> findPath(root, path1, n1)>or> not> findPath(root, path2, n2)):> >return> ->1> ># Compare the paths to get the first different value> >i>=> 0> >while>(i <>len>(path1)>and> i <>len>(path2)):> >if> path1[i] !>=> path2[i]:> >break> >i>+>=> 1> >return> path1[i>->1>]> # Driver program to test above function> if> __name__>=>=> '__main__'>:> > ># Let's create the Binary Tree shown in above diagram> >root>=> Node(>1>)> >root.left>=> Node(>2>)> >root.right>=> Node(>3>)> >root.left.left>=> Node(>4>)> >root.left.right>=> Node(>5>)> >root.right.left>=> Node(>6>)> >root.right.right>=> Node(>7>)> > >print>(>'LCA(4, 5) = %d'> %> (findLCA(root,>4>,>5>,)))> >print>(>'LCA(4, 6) = %d'> %> (findLCA(root,>4>,>6>)))> >print>(>'LCA(3, 4) = %d'> %> (findLCA(root,>3>,>4>)))> >print>(>'LCA(2, 4) = %d'> %> (findLCA(root,>2>,>4>)))> # This code is contributed by Nikhil Kumar Singh(nickzuck_007)>

C#

// C# Program for Lowest Common> // Ancestor in a Binary Tree> // A O(n) solution to find LCA> // of two given values n1 and n2> using> System.Collections;> using> System;> // A Binary Tree node> class> Node {> >public> int> data;> >public> Node left, right;> >public> Node(>int> value)> >{> >data = value;> >left = right =>null>;> >}> }> public> class> BT_NoParentPtr_Solution1 {> >Node root;> >private> ArrayList path1 =>new> ArrayList();> >private> ArrayList path2 =>new> ArrayList();> >// Finds the path from root> >// node to given root of the> >// tree.> >int> findLCA(>int> n1,>int> n2)> >{> >path1.Clear();> >path2.Clear();> >return> findLCAInternal(root, n1, n2);> >}> >private> int> findLCAInternal(Node root,>int> n1,>int> n2)> >{> >if> (!findPath(root, n1, path1)> >|| !findPath(root, n2, path2)) {> >Console.Write((path1.Count>0)> >?>'n1 is present'> >:>'n1 is missing'>);> >Console.Write((path2.Count>0)> >?>'n2 is present'> >:>'n2 is missing'>);> >return> -1;> >}> >int> i;> >for>

(i = 0; i   i++) {  // System.out.println(path1.get(i)  // + ' ' + path2.get(i));  if ((int)path1[i] != (int)path2[i])  break;  }  return (int)path1[i - 1];  }  // Finds the path from root node  // to given root of the tree,  // Stores the path in a vector  // path[], returns true if path  // exists otherwise false  private bool findPath(Node root, int n, ArrayList path)  {  // base case  if (root == null) {  return false;  }  // Store this node . The node  // will be removed if not in  // path from root to n.  path.Add(root.data);  if (root.data == n) {  return true;  }  if (root.left != null  && findPath(root.left, n, path)) {  return true;  }  if (root.right != null  && findPath(root.right, n, path)) {  return true;  }  // If not present in subtree  // rooted with root, remove root  // from path[] and return false  path.RemoveAt(path.Count - 1);  return false;  }  // Driver code  public static void Main(String[] args)  {  BT_NoParentPtr_Solution1 tree  = new BT_NoParentPtr_Solution1();  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);  tree.root.right.left = new Node(6);  tree.root.right.right = new Node(7);  Console.Write('LCA(4, 5) = ' + tree.findLCA(4, 5));  Console.Write('
LCA(4, 6) = '  + tree.findLCA(4, 6));  Console.Write('
LCA(3, 4) = '  + tree.findLCA(3, 4));  Console.Write('
LCA(2, 4) = '  + tree.findLCA(2, 4));  } } // This code is contributed by Rutvik_56>

Javascript

> >// JavaScript Program for Lowest Common> >// Ancestor in a Binary Tree> >// A O(n) solution to find LCA of> >// two given values n1 and n2> > >class Node> >{> >constructor(value) {> >this>.left =>null>;> >this>.right =>null>;> >this>.data = value;> >}> >}> > >let root;> >let path1 = [];> >let path2 = [];> > >// Finds the path from root node to given root of the tree.> >function> findLCA(n1, n2) {> >path1 = [];> >path2 = [];> >return> findLCAInternal(root, n1, n2);> >}> > >function> findLCAInternal(root, n1, n2) {> > >if> (!findPath(root, n1, path1) || !findPath(root, n2, path2))> >{> >document.write((path1.length>0) ?> >'n1 is present'> :>'n1 is missing'>);> >document.write((path2.length>0) ?> >'n2 is present'> :>'n2 is missing'>);> >return> -1;> >}> > >let i;> >for>

(i = 0; i     // System.out.println(path1.get(i) + ' ' + path2.get(i));  if (path1[i] != path2[i])  break;  }    return path1[i-1];  }    // Finds the path from root node to   // given root of the tree, Stores the  // path in a vector path[], returns true  // if path exists otherwise false  function findPath(root, n, path)  {  // base case  if (root == null) {  return false;  }    // Store this node . The node will be removed if  // not in path from root to n.  path.push(root.data);    if (root.data == n) {  return true;  }    if (root.left != null && findPath(root.left, n, path)) {  return true;  }    if (root.right != null && findPath(root.right, n, path)) {  return true;  }    // If not present in subtree rooted with root,   // remove root from  // path[] and return false  path.pop();    return false;  }    root = new Node(1);  root.left = new Node(2);  root.right = new Node(3);  root.left.left = new Node(4);  root.left.right = new Node(5);  root.right.left = new Node(6);  root.right.right = new Node(7);  document.write('LCA(4, 5) = ' + findLCA(4,5) + '');  document.write('LCA(4, 6) = ' + findLCA(4,6) + '');  document.write('LCA(3, 4) = ' + findLCA(3,4) + '');  document.write('LCA(2, 4) = ' + findLCA(2,4));>

Produzione

LCA(4, 5) = 2 LCA(4, 6) = 1 LCA(3, 4) = 1 LCA(2, 4) = 2>

Complessità temporale: SU). L'albero viene attraversato due volte, quindi vengono confrontati gli array di percorsi.
Spazio ausiliario: SU). Spazio extra per percorso1 e percorso2.

Antenato comune più basso in un albero binario per attraversamento singolo:

L'idea è di attraversare l'albero partendo dalla radice. Se una qualsiasi delle chiavi fornite (n1 e n2) corrisponde alla radice, allora la radice è LCA (assumendo che siano presenti entrambe le chiavi). Se la radice non corrisponde a nessuna delle chiavi, si ricorre ai sottoalberi sinistro e destro.

Il nodo che ha una chiave presente nel sottoalbero di sinistra e l'altra chiave presente nel sottoalbero di destra è l'LCA.

Se entrambe le chiavi si trovano nel sottoalbero di sinistra, anche il sottoalbero di sinistra ha LCA,

Altrimenti, LCA si trova nel sottoalbero destro.

Illustrazione:

Trova l'LCA di 5 e 6

Radice punta al nodo con valore 1, poiché il suo valore non corrisponde a { 5, 6 }. Cerchiamo la chiave nel sottoalbero sinistro e nel sottoalbero destro.

Sottoalbero sinistro:

Nuova radice = { 2 } ≠ 5 o 6, quindi continueremo la nostra ricorsione

Nuova radice = { 4 } , il sottoalbero sinistro e destro sono nulli, restituiremo NULL per questa chiamata

Nuova radice = { 5 } , il valore corrisponde a 5 quindi restituirà il nodo con valore 5

La chiamata di funzione per root con valore 2 restituirà un valore di 5

Sottoalbero destro:

Radice = { 3 } ≠ 5 o 6 quindi continuiamo la nostra ricorsione

Root = { 6 } = 5 o 6 , restituiremo questo nodo con valore 6

Radice = { 7 } ≠ 5 o 6, restituiremo NULL

Quindi la chiamata di funzione per root con valore 3 restituirà il nodo con valore 6

Poiché sia il sottoalbero sinistro che quello destro del nodo con valore 1 non sono NULL, quindi 1 è l'LCA

Seguire i passaggi seguenti per risolvere il problema:

Passiamo la radice a una funzione helper e controlliamo se il valore della radice corrisponde a uno qualsiasi tra n1 e n2.
- Se SÌ, restituisce la radice
- altrimenti chiamata ricorsiva sul sottoalbero sinistro e destro
Fondamentalmente, eseguiamo l'attraversamento del preordine, inizialmente controlliamo se il valore root-> corrisponde a n1 o n2. Quindi attraversare il sottoalbero sinistro e destro.
Se c'è una radice che restituisce un valore NULL e un altro NON NULL, restituiremo il corrispondente valore NON NULL per quel nodo.
Il nodo che restituisce entrambi i valori NON NULL sia per il sottoalbero sinistro che per quello destro, è il nostro antenato comune più basso.

Di seguito è riportata l'implementazione dell'approccio di cui sopra.

C++

/* C++ Program to find LCA of n1 and n2 using one traversal> >* of Binary Tree */> #include> using> namespace> std;> // A Binary Tree Node> struct> Node {> >struct> Node *left, *right;> >int> key;> };> // Utility function to create a new tree Node> Node* newNode(>int> key)> {> >Node* temp =>new> Node;> >temp->chiave = chiave;> >temp->sinistra = temp->destra = NULL;> >return> temp;> }> // This function returns pointer to LCA of two given values> // n1 and n2. This function assumes that n1 and n2 are> // present in Binary Tree> struct> Node* findLCA(>struct> Node* root,>int> n1,>int> n2)> > >// Base case> >if> (root == NULL)> >return> NULL;> >// If either n1 or n2 matches with root's key, report> >// the presence by returning root (Note that if a key is> >// ancestor of other, then the ancestor key becomes LCA> >if> (root->tasto == n1> // Driver program to test above functions> int> main()> {> >// Let us create binary tree given in the above example> >Node* root = newNode(1);> >root->sinistra = nuovoNodo(2);> >root->destra = nuovoNodo(3);> >root->sinistra->sinistra = nuovoNodo(4);> >root->sinistra->destra = nuovoNodo(5);> >root->destra->sinistra = nuovoNodo(6);> >root->destra->destra = nuovoNodo(7);> >cout <<>'LCA(4, 5) = '>

  cout << '
LCA(4, 6) = '   cout << '
LCA(3, 4) = '   cout << '
LCA(2, 4) = '   return 0; } // This code is contributed by Aditya Kumar (adityakumar129)>

C

// C Program to find LCA of n1 and n2 using one traversalof> // Binary Tree> #include> #include> // A Binary Tree Node> typedef> struct> Node {> >struct> Node *left, *right;> >int> key;> } Node;> // Utility function to create a new tree Node> Node* newNode(>int> key)> {> >Node* temp = (Node*)>malloc>(>sizeof>(Node));> >temp->chiave = chiave;> >temp->sinistra = temp->destra = NULL;> >return> temp;> }> // This function returns pointer to LCA of two given values> // n1 and n2. This function assumes that n1 and n2 are> // present in Binary Tree> Node* findLCA(Node* root,>int> n1,>int> n2)> > >// Base case> >if> (root == NULL)> >return> NULL;> >// If either n1 or n2 matches with root's key, report> >// the presence by returning root (Note that if a key is> >// ancestor of other, then the ancestor key becomes LCA> >if> (root->tasto == n1> // Driver program to test above functions> int> main()> {> >// Let us create binary tree given in the above example> >Node* root = newNode(1);> >root->sinistra = nuovoNodo(2);> >root->destra = nuovoNodo(3);> >root->sinistra->sinistra = nuovoNodo(4);> >root->sinistra->destra = nuovoNodo(5);> >root->destra->sinistra = nuovoNodo(6);> >root->destra->destra = nuovoNodo(7);> >printf>(>'LCA(4, 5) = %d'>, findLCA(root, 4, 5)->chiave);> >printf>(>

'
LCA(4, 6) = %d'>

, findLCA(root, 4, 6)->chiave);> >printf>(>

'
LCA(3, 4) = %d'>

, findLCA(root, 3, 4)->chiave);> >printf>(>

'
LCA(2, 4) = %d'>

, findLCA(root, 2, 4)->chiave);> >return> 0;> }> // This code is contributed by Aditya Kumar (adityakumar129)>

Giava

// Java implementation to find lowest common ancestor of> // n1 and n2 using one traversal of binary tree> /* Class containing left and right child of current> >node and key value*/> class> Node {> >int> data;> >Node left, right;> >public> Node(>int> item)> >{> >data = item;> >left = right =>null>;> >}> }> public> class> BinaryTree {> >// Root of the Binary Tree> >Node root;> >Node findLCA(>int> n1,>int> n2)> >{> >return> findLCA(root, n1, n2);> >}> >// This function returns pointer to LCA of two given> >// values n1 and n2. This function assumes that n1 and> >// n2 are present in Binary Tree> >Node findLCA(Node node,>int> n1,>int> n2)> >> >// Base case> >if> (node ==>null>)> >return> null>;> >// If either n1 or n2 matches with root's key,> >// report the presence by returning root (Note that> >// if a key is ancestor of other, then the ancestor> >// key becomes LCA> >if> (node.data == n1> >/* Driver program to test above functions */> >public> static> void> main(String args[])> >{> >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>);> >tree.root.right.left =>new> Node(>6>);> >tree.root.right.right =>new> Node(>7>);> >System.out.println(>'LCA(4, 5) = '> >+ tree.findLCA(>4>,>5>).data);> >System.out.println(>'LCA(4, 6) = '> >+ tree.findLCA(>4>,>6>).data);> >System.out.println(>'LCA(3, 4) = '> >+ tree.findLCA(>3>,>4>).data);> >System.out.println(>'LCA(2, 4) = '> >+ tree.findLCA(>2>,>4>).data);> >}> }>

Python3

# Python program to find LCA of n1 and n2 using one> # traversal of Binary tree> # A binary tree node> class> Node:> ># Constructor to create a new tree node> >def> __init__(>self>, key):> >self>.key>=> key> >self>.left>=> None> >self>.right>=> None> # This function returns pointer to LCA of two given> # values n1 and n2> # This function assumes that n1 and n2 are present in> # Binary Tree> def> findLCA(root, n1, n2):> ># Base Case> >if> root>is> None>:> >return> None> ># If either n1 or n2 matches with root's key, report> ># the presence by returning root (Note that if a key is> ># ancestor of other, then the ancestor key becomes LCA> >if> root.key>=>=> n1>or> root.key>=>=> n2:> >return> root> ># Look for keys in left and right subtrees> >left_lca>=> findLCA(root.left, n1, n2)> >right_lca>=> findLCA(root.right, n1, n2)> ># If both of the above calls return Non-NULL, then one key> ># is present in once subtree and other is present in other,> ># So this node is the LCA> >if> left_lca>and> right_lca:> >return> root> ># Otherwise check if left subtree or right subtree is LCA> >return> left_lca>if> left_lca>is> not> None> else> right_lca> # Driver code> if> __name__>=>=> '__main__'>:> > ># Let us create a binary tree given in the above example> >root>=> Node(>1>)> >root.left>=> Node(>2>)> >root.right>=> Node(>3>)> >root.left.left>=> Node(>4>)> >root.left.right>=> Node(>5>)> >root.right.left>=> Node(>6>)> >root.right.right>=> Node(>7>)> >print>(>'LCA(4, 5) = '>, findLCA(root,>4>,>5>).key)> >print>(>'LCA(4, 6) = '>, findLCA(root,>4>,>6>).key)> >print>(>'LCA(3, 4) = '>, findLCA(root,>3>,>4>).key)> >print>(>'LCA(2, 4) = '>, findLCA(root,>2>,>4>).key)> # This code is contributed by Nikhil Kumar Singh(nickzuck_007)>

C#

// C# implementation to find lowest common> // ancestor of n1 and n2 using one traversal> // of binary tree> using> System;> // Class containing left and right> // child of current node and key value> public> class> Node {> >public> int> data;> >public> Node left, right;> >public> Node(>int> item)> >{> >data = item;> >left = right =>null>;> >}> }> class> BinaryTree {> >// Root of the Binary Tree> >Node root;> >Node findLCA(>int> n1,>int> n2)> >{> >return> findLCA(root, n1, n2);> >}> >// This function returns pointer to LCA> >// of two given values n1 and n2. This> >// function assumes that n1 and n2 are> >// present in Binary Tree> >Node findLCA(Node node,>int> n1,>int> n2)> > node.data == n2)> >return> node;> >// Look for keys in left and right subtrees> >Node left_lca = findLCA(node.left, n1, n2);> >Node right_lca = findLCA(node.right, n1, n2);> >// If both of the above calls return Non-NULL,> >// then one key is present in once subtree> >// and other is present in other, So this> >// node is the LCA> >if> (left_lca !=>null> && right_lca !=>null>)> >return> node;> >// Otherwise check if left subtree or> >// right subtree is LCA> >return> (left_lca !=>null>) ? left_lca : right_lca;> >> >// Driver code> >public> static> void> Main(>string>[] args)> >{> >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);> >tree.root.right.left =>new> Node(6);> >tree.root.right.right =>new> Node(7);> >Console.WriteLine(>'LCA(4, 5) = '> >+ tree.findLCA(4, 5).data);> >Console.WriteLine(>'LCA(4, 6) = '> >+ tree.findLCA(4, 6).data);> >Console.WriteLine(>'LCA(3, 4) = '> >+ tree.findLCA(3, 4).data);> >Console.WriteLine(>'LCA(2, 4) = '> >+ tree.findLCA(2, 4).data);> >}> }> // This code is contributed by pratham76>

Javascript

> >// JavaScript implementation to find> >// lowest common ancestor of> >// n1 and n2 using one traversal of binary tree> > >class Node> >{> >constructor(item) {> >this>.left =>null>;> >this>.right =>null>;> >this>.data = item;> >}> >}> > >//Root of the Binary Tree> >let root;> > >function> findlCA(n1, n2)> >{> >return> findLCA(root, n1, n2);> >}> > >// This function returns pointer to LCA of two given> >// values n1 and n2. This function assumes that n1 and> >// n2 are present in Binary Tree> >function> findLCA(node, n1, n2)> >> > >root =>new> Node(1);> >root.left =>new> Node(2);> >root.right =>new> Node(3);> >root.left.left =>new> Node(4);> >root.left.right =>new> Node(5);> >root.right.left =>new> Node(6);> >root.right.right =>new> Node(7);> >document.write(>'LCA(4, 5) = '> +> >findlCA(4, 5).data +>''>);> >document.write(>'LCA(4, 6) = '> +> >findlCA(4, 6).data +>''>);> >document.write(>'LCA(3, 4) = '> +> >findlCA(3, 4).data +>''>);> >document.write(>'LCA(2, 4) = '> +> >findlCA(2, 4).data +>''>);> > >

Produzione

LCA(4, 5) = 2 LCA(4, 6) = 1 LCA(3, 4) = 1 LCA(2, 4) = 2>

Complessità temporale : O(N) poiché il metodo esegue un semplice attraversamento dell'albero in modo bottom-up.
Spazio ausiliario: O(H), dove H è l'altezza dell'albero.

Nota: Il metodo sopra presuppone questo le chiavi sono presenti nell'albero binario . Se una chiave è presente e l'altra è assente, restituisce la chiave presente come LCA (idealmente avrebbe dovuto restituire NULL). Possiamo estendere questo metodo per gestire tutti i casi controllando prima se n1 e n2 sono presenti nell'albero e poi trovando l'LCA di n1 e n2. Per verificare se il nodo è presente o meno nell'albero binario, attraversare l'albero separatamente per entrambi i nodi n1 e n2.

C++

/* C++ program to find LCA of n1 and n2 using one traversal> >of Binary Tree. It handles all cases even when n1 or n2> >is not there in Binary Tree */> #include> using> namespace> std;> // A Binary Tree Node> struct> Node {> >struct> Node *left, *right;> >int> key;> };> // Utility function to create a new tree Node> Node* newNode(>int> key)> {> >Node* temp =>new> Node;> >temp->chiave = chiave;> >temp->sinistra = temp->destra = NULL;> >return> temp;> }> // This function returns pointer to LCA of two given> // valuesn1 and n2.> struct> Node* findLCAUtil(>struct> Node* root,>int> n1,>int> n2)> > // Returns true if key k is present in tree rooted with root> bool> find(Node* root,>int> k)> find(root->giusto, k))> >return> true>;> >// Else return false> >return> false>;> > // This function returns LCA of n1 and n2 only if both n1> // and n2 are present in tree, otherwise returns NULL;> Node* findLCA(Node* root,>int> n1,>int> n2)> {> >// Return LCA only if both n1 and n2 are present in tree> >if> (find(root, n1) and find(root, n2))> >return> findLCAUtil(root, n1, n2);> >// Else return NULL> >return> NULL;> }> // Driver program to test above functions> int> main()> {> >// Let us create a binary tree given in the above> >// example> >Node* root = newNode(1);> >root->sinistra = nuovoNodo(2);> >root->destra = nuovoNodo(3);> >root->sinistra->sinistra = nuovoNodo(4);> >root->sinistra->destra = nuovoNodo(5);> >root->destra->sinistra = nuovoNodo(6);> >root->destra->destra = nuovoNodo(7);> >Node* lca = findLCA(root, 4, 5);> >if> (lca != NULL)> >cout <<>'LCA(4, 5) = '>

  else  cout << 'Keys are not present ';  lca = findLCA(root, 4, 10);  if (lca != NULL)  cout << '
LCA(4, 10) = '   else  cout << '
Keys are not present ';  return 0; } // This code is contributed by Kshitij Dwivedi // (kshitijdwivedi28)>

Giava

// Java implementation to find lowest common ancestor of> // n1 and n2 using one traversal of binary tree> // It also handles cases even when n1 and n2 are not there> // in Tree> /* Class containing left and right child of current node and> >* key */> class> Node {> >int> data;> >Node left, right;> >public> Node(>int> item)> >{> >data = item;> >left = right =>null>;> >}> }> public> class> BinaryTree {> >// Root of the Binary Tree> >Node root;> >static> boolean> v1 =>false>, v2 =>false>;> >// This function returns pointer to LCA of two given> >// values n1 and n2.> >// v1 is set as true by this function if n1 is found> >// v2 is set as true by this function if n2 is found> >Node findLCAUtil(Node node,>int> n1,>int> n2)> >{> >// Base case> >if> (node ==>null>)> >return> null>;> >// Store result in temp, in case of key match so> >// that we can search for other key also.> >Node temp =>null>;> >// If either n1 or n2 matches with root's key,> >// report the presence by setting v1 or v2 as true> >// and return root (Note that if a key is ancestor> >// of other, then the ancestor key becomes LCA)> >if> (node.data == n1) {> >v1 =>true>;> >temp = node;> >}> >if> (node.data == n2) {> >v2 =>true>;> >temp = node;> >}> >// Look for keys in left and right subtrees> >Node left_lca = findLCAUtil(node.left, n1, n2);> >Node right_lca = findLCAUtil(node.right, n1, n2);> >if> (temp !=>null>)> >return> temp;> >// If both of the above calls return Non-NULL, then> >// one key is present in once subtree and other is> >// present in other, So this node is the LCA> >if> (left_lca !=>null> && right_lca !=>null>)> >return> node;> >// Otherwise check if left subtree or right subtree> >// is LCA> >return> (left_lca !=>null>) ? left_lca : right_lca;> >}> >// Finds lca of n1 and n2 under the subtree rooted with> >// 'node'> >Node findLCA(>int> n1,>int> n2)> >{> >// Initialize n1 and n2 as not visited> >v1 =>false>;> >v2 =>false>;> >// Find lca of n1 and n2 using the technique> >// discussed above> >Node lca = findLCAUtil(root, n1, n2);> >// Return LCA only if both n1 and n2 are present in> >// tree> >if> (v1 && v2)> >return> lca;> >// Else return NULL> >return> null>;> >}> >/* Driver program to test above functions */> >public> static> void> main(String args[])> >{> >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>);> >tree.root.right.left =>new> Node(>6>);> >tree.root.right.right =>new> Node(>7>);> >Node lca = tree.findLCA(>4>,>5>);> >if> (lca !=>null>)> >System.out.println(>'LCA(4, 5) = '> + lca.data);> >else> >System.out.println(>'Keys are not present'>);> >lca = tree.findLCA(>4>,>10>);> >if> (lca !=>null>)> >System.out.println(>'LCA(4, 10) = '> + lca.data);> >else> >System.out.println(>'Keys are not present'>);> >}> }>

Python3

''' Program to find LCA of n1 and n2 using one traversal of> >Binary tree> It handles all cases even when n1 or n2 is not there in tree> '''> # A binary tree node> class> Node:> ># Constructor to create a new node> >def> __init__(>self>, key):> >self>.key>=> key> >self>.left>=> None> >self>.right>=> None> # This function return pointer to LCA of two given values> # n1 and n2> # v1 is set as true by this function if n1 is found> # v2 is set as true by this function if n2 is found> def> findLCAUtil(root, n1, n2, v):> ># Base Case> >if> root>is> None>:> >return> None> ># IF either n1 or n2 matches ith root's key, report> ># the presence by setting v1 or v2 as true and return> ># root (Note that if a key is ancestor of other, then> ># the ancestor key becomes LCA)> >if> root.key>=>=> n1:> >v[>0>]>=> True> >return> root> >if> root.key>=>=> n2:> >v[>1>]>=> True> >return> root> ># Look for keys in left and right subtree> >left_lca>=> findLCAUtil(root.left, n1, n2, v)> >right_lca>=> findLCAUtil(root.right, n1, n2, v)> ># If both of the above calls return Non-NULL, then one key> ># is present in once subtree and other is present in other,> ># So this node is the LCA> >if> left_lca>and> right_lca:> >return> root> ># Otherwise check if left subtree or right subtree is LCA> >return> left_lca>if> left_lca>is> not> None> else> right_lca> def> find(root, k):> ># Base Case> >if> root>is> None>:> >return> False> ># If key is present at root, or if left subtree or right> ># subtree , return true> >if> (root.key>=>=> k>or> find(root.left, k)>or> >find(root.right, k)):> >return> True> ># Else return false> >return> False> # This function returns LCA of n1 and n2 on value if both> # n1 and n2 are present in tree, otherwise returns None> def> findLCA(root, n1, n2):> ># Initialize n1 and n2 as not visited> >v>=> [>False>,>False>]> ># Find lca of n1 and n2 using the technique discussed above> >lca>=> findLCAUtil(root, n1, n2, v)> ># Returns LCA only if both n1 and n2 are present in tree> >if> (v[>0>]>and> v[>1>]>or> v[>0>]>and> find(lca, n2)>or> v[>1>]>and> >find(lca, n1)):> >return> lca> ># Else return None> >return> None> # Driver program to test above function> root>=> Node(>1>)> root.left>=> Node(>2>)> root.right>=> Node(>3>)> root.left.left>=> Node(>4>)> root.left.right>=> Node(>5>)> root.right.left>=> Node(>6>)> root.right.right>=> Node(>7>)> lca>=> findLCA(root,>4>,>5>)> if> lca>is> not> None>:> >print>(>'LCA(4, 5) = '>, lca.key)> else>:> >print>(>'Keys are not present'>)> lca>=> findLCA(root,>4>,>10>)> if> lca>is> not> None>:> >print>(>'LCA(4,10) = '>, lca.key)> else>:> >print>(>'Keys are not present'>)> # This code is contributed by Nikhil Kumar Singh(nickzuck_007)>

C#

using> System;> // c# implementation to find lowest common ancestor of> // n1 and n2 using one traversal of binary tree> // It also handles cases even when n1 and n2 are not there> // in Tree> /* Class containing left and right child of current node and> >* key */> public> class> Node {> >public> int> data;> >public> Node left, right;> >public> Node(>int> item)> >{> >data = item;> >left = right =>null>;> >}> }> public> class> BinaryTree {> >// Root of the Binary Tree> >public> Node root;> >public> static> bool> v1 =>false>, v2 =>false>;> >// This function returns pointer to LCA of two given> >// values n1 and n2.> >// v1 is set as true by this function if n1 is found> >// v2 is set as true by this function if n2 is found> >public> virtual> Node findLCAUtil(Node node,>int> n1,> >int> n2)> >{> >// Base case> >if> (node ==>null>) {> >return> null>;> >}> >// Store result in temp, in case of key match so> >// that we can search for other key also.> >Node temp =>null>;> >// If either n1 or n2 matches with root's key,> >// report the presence by setting v1 or v2 as true> >// and return root (Note that if a key is ancestor> >// of other, then the ancestor key becomes LCA)> >if> (node.data == n1) {> >v1 =>true>;> >temp = node;> >}> >if> (node.data == n2) {> >v2 =>true>;> >temp = node;> >}> >// Look for keys in left and right subtrees> >Node left_lca = findLCAUtil(node.left, n1, n2);> >Node right_lca = findLCAUtil(node.right, n1, n2);> >if> (temp !=>null>) {> >return> temp;> >}> >// If both of the above calls return Non-NULL, then> >// one key is present in once subtree and other is> >// present in other, So this node is the LCA> >if> (left_lca !=>null> && right_lca !=>null>) {> >return> node;> >}> >// Otherwise check if left subtree or right subtree> >// is LCA> >return> (left_lca !=>null>) ? left_lca : right_lca;> >}> >// Finds lca of n1 and n2 under the subtree rooted with> >// 'node'> >public> virtual> Node findLCA(>int> n1,>int> n2)> >{> >// Initialize n1 and n2 as not visited> >v1 =>false>;> >v2 =>false>;> >// Find lca of n1 and n2 using the technique> >// discussed above> >Node lca = findLCAUtil(root, n1, n2);> >// Return LCA only if both n1 and n2 are present in> >// tree> >if> (v1 && v2) {> >return> lca;> >}> >// Else return NULL> >return> null>;> >}> >/* Driver program to test above functions */> >public> static> void> Main(>string>[] args)> >{> >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);> >tree.root.right.left =>new> Node(6);> >tree.root.right.right =>new> Node(7);> >Node lca = tree.findLCA(4, 5);> >if> (lca !=>null>) {> >Console.WriteLine(>'LCA(4, 5) = '> + lca.data);> >}> >else> {> >Console.WriteLine(>'Keys are not present'>);> >}> >lca = tree.findLCA(4, 10);> >if> (lca !=>null>) {> >Console.WriteLine(>'LCA(4, 10) = '> + lca.data);> >}> >else> {> >Console.WriteLine(>'Keys are not present'>);> >}> >}> }> // This code is contributed by Shrikant13>

Javascript

> // JavaScript implementation to find lowest> // common ancestor of n1 and n2 using one> // traversal of binary tree. It also handles> // cases even when n1 and n2 are not there in Tree> // Class containing left and right child> // of current node and key> class Node> {> >constructor(item)> >{> >this>.data = item;> >this>.left =>null>;> >this>.right =>null>;> >}> }> class BinaryTree{> > // Root of the Binary Tree> constructor()> {> >this>.root =>null>;> >this>.v1 =>false>;> >this>.v2 =>false>;> }> // This function returns pointer to LCA> // of two given values n1 and n2.> // v1 is set as true by this function> // if n1 is found> // v2 is set as true by this function> // if n2 is found> findLCAUtil(node, n1, n2)> {> > >// Base case> >if> (node ==>null>)> >{> >return> null>;> >}> > >// Store result in temp, in case of> >// key match so that we can search> >// for other key also.> >var> temp =>null>;> > >// If either n1 or n2 matches with root's key,> >// report the presence by setting v1 or v2 as> >// true and return root (Note that if a key> >// is ancestor of other, then the ancestor> >// key becomes LCA)> >if> (node.data == n1)> >{> >this>.v1 =>true>;> >temp = node;> >}> >if> (node.data == n2)> >{> >this>.v2 =>true>;> >temp = node;> >}> > >// Look for keys in left and right subtrees> >var> left_lca =>this>.findLCAUtil(node.left, n1, n2);> >var> right_lca =>this>.findLCAUtil(node.right, n1, n2);> > >if> (temp !=>null>)> >{> >return> temp;> >}> > >// If both of the above calls return Non-NULL,> >// then one key is present in once subtree and> >// other is present in other, So this node is the LCA> >if> (left_lca !=>null> && right_lca !=>null>)> >{> >return> node;> >}> > >// Otherwise check if left subtree or> >// right subtree is LCA> >return> left_lca !=>null> ? left_lca : right_lca;> }> // Finds lca of n1 and n2 under the> // subtree rooted with 'node'> findLCA(n1, n2)> {> > >// Initialize n1 and n2 as not visited> >this>.v1 =>false>;> >this>.v2 =>false>;> > >// Find lca of n1 and n2 using the> >// technique discussed above> >var> lca =>this>.findLCAUtil(>this>.root, n1, n2);> > >// Return LCA only if both n1 and n2> >// are present in tree> >if> (>this>.v1 &&>this>.v2)> >{> >return> lca;> >}> > >// Else return NULL> >return> null>;> }> }> // Driver code> var> 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);> tree.root.right.left =>new> Node(6);> tree.root.right.right =>new> Node(7);> var> lca = tree.findLCA(4, 5);> if> (lca !=>null>)> {> >document.write(>'LCA(4, 5) = '> +> >lca.data +>' '>);> }>else> {> >document.write(>'Keys are not present'> +>' '>);> }> lca = tree.findLCA(4, 10);> if> (lca !=>null>)> {> >document.write(>'LCA(4, 10) = '> +> >lca.data +>' '>);> }> else> {> >document.write(>'Keys are not present'> +>' '>);> }> // This code is contributed by rdtank> >

Produzione

LCA(4, 5) = 2 Keys are not present>

Complessità temporale : O(N) poiché il metodo esegue un semplice attraversamento dell'albero in modo bottom-up.
Spazio ausiliario: O(H), dove h è l'altezza dell'albero.

Utilizzando una struttura dati ausiliaria (tabella hash):

The basic idea behind the 'Using an auxiliary data structure' approach for finding the lowest common ancestor of two nodes in a binary tree is to use a hash table or a map to store the parent pointers of each node. Once we have the parent pointers, we can traverse up from the first node and add all its ancestors to a set or a list. Then we can traverse up from the second node and check if each ancestor is already in the set or the list. The first ancestor that is already in the set or the list is the lowest common ancestor.>

Seguire i passaggi per implementare l'approccio sopra descritto:

Crea una tabella hash o una mappa per memorizzare i puntatori principali di ciascun nodo nell'albero binario.
Attraversa l'albero binario e popola la tabella hash o la mappa con i puntatori principali per ciascun nodo.
Partendo dal primo nodo, attraversa l'albero e aggiungi ciascun antenato a un insieme o a un elenco.
Partendo dal secondo nodo, attraversa l'albero e controlla se ciascun antenato è già nel set o nell'elenco. Il primo antenato già presente nell'insieme o nell'elenco è l'antenato comune più basso.
Se non viene trovato alcun antenato comune, restituire null o qualsiasi altro valore che indichi l'assenza di un antenato comune.

Di seguito è riportata l'implementazione dell'approccio di cui sopra:

C++

// C++ code to implement above approach> #include> #include> #include> #include> using> namespace> std;> // Definition of a binary tree node> struct> Node {> >int> data;> >Node* left;> >Node* right;> };> // Function to create a new binary tree node> Node* newNode(>int> data)> {> >Node* node =>new> Node;> >node->dati = dati;> >node->sinistra = NULL;> >node->destra = NULL;> >return> (node);> }> // Function to build a hash table or a map of parent> // pointers for each node in the tree> unordered_map buildParentMap(Node* root)> {> >unordered_map parentMap;> >parentMap[root] = NULL;> >vector queue = { root };> >while> (!queue.empty()) {> >Node* node = queue.front();> >queue.erase(queue.begin());> >if> (node->sinistra) {> >parentMap[node->sinistra] = nodo;> >queue.push_back(node->sinistra);> >}> >if> (node->destra) {> >parentMap[node->destra] = nodo;> >queue.push_back(node->destra);> >}> >}> >return> parentMap;> }> // Function to find the lowest common ancestor of two nodes> // using an auxiliary data structure> int> findLCA(Node* root,>int> n1,>int> n2)> {> >// Build a hash table or a map of parent pointers for> >// each node in the tree> >unordered_map parentMap> >= buildParentMap(root);> >// Find the nodes with values n1 and n2> >Node* p = NULL;> >Node* q = NULL;> >vector queue = { root };> >while> (!queue.empty()) {> >Node* node = queue.front();> >queue.erase(queue.begin());> >if> (node->dato == n1) {> >p = node;> >}> >if> (node->dati == n2) {> >q = node;> >}> >if> (node->sinistra) {> >queue.push_back(node->sinistra);> >}> >if> (node->destra) {> >queue.push_back(node->destra);> >}> >}> >// Add all the ancestors of the first node to a set or a> >// list> >set ancestors;> >while> (p) {> >ancestors.insert(p);> >p = parentMap[p];> >}> >// Traverse up from the second node and check if each> >// ancestor is already in the set or the list> >while> (q) {> >if> (ancestors.find(q) != ancestors.end()) {> >return> q> >->dati;>// The first ancestor that is> >// already in the set or the list is> >// the lowest common ancestor> >}> >q = parentMap[q];> >}> >return> -1;>// No common ancestor found> }> // Driver code> int> main()> {> >Node* root = newNode(1);> >root->sinistra = nuovoNodo(2);> >root->destra = nuovoNodo(3);> >root->sinistra->sinistra = nuovoNodo(4);> >root->sinistra->destra = nuovoNodo(5);> >root->destra->sinistra = nuovoNodo(6);> >root->destra->destra = nuovoNodo(7);> >cout <<>'LCA(4, 5) = '> << findLCA(root, 4, 5) << endl;> >cout <<>'LCA(4, 6) = '> << findLCA(root, 4, 6) << endl;> >cout <<>'LCA(3,4) = '> << findLCA(root, 3, 4) << endl;> >cout <<>'LCA(2, 4) = '> << findLCA(root, 2, 4) << endl;> >return> 0;> }> // This code is contributed by Veerendra_Singh_Rajpoot>

Giava

import> java.util.*;> // Definition of a binary tree node> class> Node {> >int> data;> >Node left, right;> >public> Node(>int> item)> >{> >data = item;> >left = right =>null>;> >}> }> class> Main {> >// Function to build a hash table or a map of parent> >// pointers for each node in the tree> >static> Map buildParentMap(Node root)> >{> >Map parentMap =>new> HashMap();> >parentMap.put(root,>null>);> >Queue queue =>new> LinkedList();> >queue.add(root);> >while> (!queue.isEmpty()) {> >Node node = queue.poll();> >if> (node.left !=>null>) {> >parentMap.put(node.left, node);> >queue.add(node.left);> >}> >if> (node.right !=>null>) {> >parentMap.put(node.right, node);> >queue.add(node.right);> >}> >}> >return> parentMap;> >}> >// Function to find the lowest common ancestor of two> >// nodes using an auxiliary data structure> >static> int> findLCA(Node root,>int> n1,>int> n2)> >{> >// Build a hash table or a map of parent pointers> >// for each node in the tree> >Map parentMap = buildParentMap(root);> >// Find the nodes with values n1 and n2> >Node p =>null>, q =>null>;> >Queue queue =>new> LinkedList();> >queue.add(root);> >while> (!queue.isEmpty()) {> >Node node = queue.poll();> >if> (node.data == n1) {> >p = node;> >}> >if> (node.data == n2) {> >q = node;> >}> >if> (node.left !=>null>) {> >queue.add(node.left);> >}> >if> (node.right !=>null>) {> >queue.add(node.right);> >}> >}> >// Add all the ancestors of the first node to a set> >// or a list> >Set ancestors =>new> HashSet();> >while> (p !=>null>) {> >ancestors.add(p);> >p = parentMap.get(p);> >}> >// Traverse up from the second node and check if> >// each ancestor is already in the set or the list> >while> (q !=>null>) {> >if> (ancestors.contains(q)) {> >return> q.data;> >}> >q = parentMap.get(q);> >}> >return> ->1>;>// No common ancestor found> >}> >public> static> void> main(String[] args)> >{> >Node root =>new> Node(>1>);> >root.left =>new> Node(>2>);> >root.right =>new> Node(>3>);> >root.left.left =>new> Node(>4>);> >root.left.right =>new> Node(>5>);> >root.right.left =>new> Node(>6>);> >root.right.right =>new> Node(>7>);> >System.out.println(>'LCA(4, 5) = '> >+ findLCA(root,>4>,>5>));> >System.out.println(>'LCA(4, 6) = '> >+ findLCA(root,>4>,>6>));> >System.out.println(>'LCA(3, 4) = '> >+ findLCA(root,>3>,>4>));> >System.out.println(>'LCA(3, 4) = '> >+ findLCA(root,>2>,>4>));> >}> }>

Python3

from> collections>import> deque> # Definition of a binary tree node> class> Node:> >def> __init__(>self>, data):> >self>.data>=> data> >self>.left>=> None> >self>.right>=> None> # Function to build a hash table or a map of parent> # pointers for each node in the tree> def> buildParentMap(root):> >parentMap>=> {}> >parentMap[root]>=> None> >queue>=> deque([root])> >while> queue:> >node>=> queue.popleft()> >if> node.left:> >parentMap[node.left]>=> node> >queue.append(node.left)> >if> node.right:> >parentMap[node.right]>=> node> >queue.append(node.right)> >return> parentMap> # Function to find the lowest common ancestor of two nodes> # using an auxiliary data structure> def> findLCA(root, n1, n2):> ># Build a hash table or a map of parent pointers for> ># each node in the tree> >parentMap>=> buildParentMap(root)> ># Find the nodes with values n1 and n2> >p, q>=> None>,>None> >queue>=> deque([root])> >while> queue:> >node>=> queue.popleft()> >if> node.data>=>=> n1:> >p>=> node> >if> node.data>=>=> n2:> >q>=> node> >if> node.left:> >queue.append(node.left)> >if> node.right:> >queue.append(node.right)> ># Add all the ancestors of the first node to a set or a> ># list> >ancestors>=> set>()> >while> p:> >ancestors.add(p)> >p>=> parentMap[p]> ># Traverse up from the second node and check if each> ># ancestor is already in the set or the list> >while> q:> >if> q>in> ancestors:> >return> q.data> >q>=> parentMap[q]> >return> ->1> # No common ancestor found> # Driver code> if> __name__>=>=> '__main__'>:> >root>=> Node(>1>)> >root.left>=> Node(>2>)> >root.right>=> Node(>3>)> >root.left.left>=> Node(>4>)> >root.left.right>=> Node(>5>)> >root.right.left>=> Node(>6>)> >root.right.right>=> Node(>7>)> >print>(>'LCA(4, 5) = '>, findLCA(root,>4>,>5>))> >print>(>'LCA(4, 6) = '>, findLCA(root,>4>,>6>))> >print>(>'LCA(3, 4) = '>, findLCA(root,>3>,>4>))> >print>(>'LCA(2, 4) = '>, findLCA(root,>2>,>4>))>

C#

using> System;> using> System.Collections.Generic;> // Definition of a binary tree node> class> Node> {> >public> int> data;> >public> Node left, right;> >public> Node(>int> item)> >{> >data = item;> >left = right =>null>;> >}> }> class> MainClass> {> >// Function to build a hash table or a map of parent> >// pointers for each node in the tree> >static> Dictionary BuildParentMap(Node root)> >{> >Dictionary parentMap =>new> Dictionary();> >parentMap.Add(root,>null>);> >Queue queue =>new> Queue();> >queue.Enqueue(root);> >while> (queue.Count != 0)> >{> >Node node = queue.Dequeue();> >if> (node.left !=>null>)> >{> >parentMap.Add(node.left, node);> >queue.Enqueue(node.left);> >}> >if> (node.right !=>null>)> >{> >parentMap.Add(node.right, node);> >queue.Enqueue(node.right);> >}> >}> >return> parentMap;> >}> >// Function to find the lowest common ancestor of two> >// nodes using an auxiliary data structure> >static> int> FindLCA(Node root,>int> n1,>int> n2)> >{> >// Build a hash table or a map of parent pointers> >// for each node in the tree> >Dictionary parentMap = BuildParentMap(root);> >// Find the nodes with values n1 and n2> >Node p =>null>, q =>null>;> >Queue queue =>new> Queue();> >queue.Enqueue(root);> >while> (queue.Count != 0)> >{> >Node node = queue.Dequeue();> >if> (node.data == n1)> >{> >p = node;> >}> >if> (node.data == n2)> >{> >q = node;> >}> >if> (node.left !=>null>)> >{> >queue.Enqueue(node.left);> >}> >if> (node.right !=>null>)> >{> >queue.Enqueue(node.right);> >}> >}> >// Add all the ancestors of the first node to a set> >// or a list> >HashSet ancestors =>new> HashSet();> >while> (p !=>null>)> >{> >ancestors.Add(p);> >p = parentMap[p];> >}> >// Traverse up from the second node and check if> >// each ancestor is already in the set or the list> >while> (q !=>null>)> >{> >if> (ancestors.Contains(q))> >{> >return> q.data;> >}> >q = parentMap[q];> >}> >return> -1;>// No common ancestor found> >}> >public> static> void> Main()> >{> >Node root =>new> Node(1);> >root.left =>new> Node(2);> >root.right =>new> Node(3);> >root.left.left =>new> Node(4);> >root.left.right =>new> Node(5);> >root.right.left =>new> Node(6);> >root.right.right =>new> Node(7);> >Console.WriteLine(>'LCA(4, 5) = '> + FindLCA(root, 4, 5));> >Console.WriteLine(>'LCA(4, 6) = '> + FindLCA(root, 4, 6));> >Console.WriteLine(>'LCA(3, 4) = '> + FindLCA(root, 3, 4));> >Console.WriteLine(>'LCA(2, 4) = '> + FindLCA(root, 2, 4));> >}> }> // This code is contributed by akashish__>

Javascript

// javascript code addition> // Definition of a binary tree node> class Node {> >constructor(item) {> >this>.data = item;> >this>.left =>null>;> >this>.right =>null>;> >}> }> // Function to build a hash table or a map of parent> // pointers for each node in the tree> function> buildParentMap(root) {> >const parentMap =>new> Map();> >parentMap.set(root,>null>);> >const queue = [];> >queue.push(root);> >while> (queue.length>0) {> >const node = queue.shift();> >if> (node.left !=>null>) {> >parentMap.set(node.left, node);> >queue.push(node.left);> >}> >if> (node.right !=>null>) {> >parentMap.set(node.right, node);> >queue.push(node.right);> >}> >}> >return> parentMap;> }> // Function to find the lowest common ancestor of two> // nodes using an auxiliary data structure> function> findLCA(root, n1, n2) {> >// Build a hash table or a map of parent pointers> >// for each node in the tree> >const parentMap = buildParentMap(root);> >// Find the nodes with values n1 and n2> >let p =>null>, q =>null>;> >const queue = [];> >queue.push(root);> >while> (queue.length>0) {> >const node = queue.shift();> >if> (node.data === n1) {> >p = node;> >}> >if> (node.data === n2) {> >q = node;> >}> >if> (node.left !=>null>) {> >queue.push(node.left);> >}> >if> (node.right !=>null>) {> >queue.push(node.right);> >}> >}> >// Add all the ancestors of the first node to a set> >// or a list> >const ancestors =>new> Set();> >while> (p !=>null>) {> >ancestors.add(p);> >p = parentMap.get(p);> >}> >// Traverse up from the second node and check if> >// each ancestor is already in the set or the list> >while> (q !=>null>) {> >if> (ancestors.has(q)) {> >return> q.data;> >}> >q = parentMap.get(q);> >}> >return> -1;>// No common ancestor found> }> // Test the function> const root =>new> Node(1);> root.left =>new> Node(2);> root.right =>new> Node(3);> root.left.left =>new> Node(4);> root.left.right =>new> Node(5);> root.right.left =>new> Node(6);> root.right.right =>new> Node(7);> console.log(>'LCA(4, 5) = '> + findLCA(root, 4, 5));> console.log(>'LCA(4, 6) = '> + findLCA(root, 4, 6));> console.log(>'LCA(3, 4) = '> + findLCA(root, 3, 4));> console.log(>'LCA(2, 4) = '> + findLCA(root, 2, 4));> // The code is contributed by Nidhi goel.>

Produzione

LCA(4, 5) = 2 LCA(4, 6) = 1 LCA(3,4) = 1 LCA(2, 4) = 2>

Complessità temporale: O(n),

componenti del robot

La complessità temporale del codice dato è O(n), dove n è il numero di nodi nell'albero binario.

Per costruire la mappa madre per ciascun nodo dell'albero è necessario visitare ciascun nodo una volta, il che richiede tempo O(n). Per trovare i nodi con valori n1 e n2 è necessario visitare ciascun nodo una volta, il che richiede anche tempo O(n). Passando dal secondo nodo e controllando se ciascun antenato è già nell'insieme o l'elenco richiede tempo O(h), dove h è l'altezza dell'albero binario.

Nel peggiore dei casi, l'altezza dell'albero binario è O(n), se l'albero binario è inclinato. Pertanto, la complessità temporale complessiva del codice dato è O(n) + O(n) + O(n) = O(n).

Complessità spaziale: O(n),

La complessità spaziale del codice dato è O(n) nel caso peggiore. Questo perché la dimensione della mappa madre creata per ciascun nodo dell'albero è O(n). Inoltre, nel caso peggiore, l'insieme degli antenati può contenere anche tutti i nodi dell'albero binario, che occupa anch'esso lo spazio O(n). Infine, la coda utilizzata per attraversare l'albero binario occupa O(n) spazio. Pertanto, la complessità spaziale complessiva del codice dato è O(n) + O(n) + O(n) = O(n).

Abbiamo discusso una soluzione efficiente per trovare LCA nell'albero di ricerca binario. Nell'albero di ricerca binario, utilizzando le proprietà BST, possiamo trovare LCA in tempo O(h) dove h è l'altezza dell'albero. Tale implementazione non è possibile in Binary Tree poiché le chiavi dei nodi dell'albero binario non seguono alcun ordine.

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LCA utilizzando il puntatore genitore
Antenato comune più basso in un albero di ricerca binario.
Trova LCA nell'albero binario utilizzando RMQ