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Construct a Binary Search Tree from given postorder

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Given postorder traversal of a binary search tree, construct the BST.

For example, if the given traversal is {1, 7, 5, 50, 40, 10}, then following tree should be constructed and root of the tree should be returned. 

     10
   /   \
  5     40
 /  \      \
1    7      50
Recommended Practice

Method 1 ( O(n^2) time complexity ):

The last element of postorder traversal is always root. We first construct the root. Then we find the index of last element which is smaller than root. Let the index be ‘i’. The values between 0 and ‘i’ are part of left subtree, and the values between ‘i+1’ and ‘n-2’ are part of right subtree. Divide given post[] at index “i” and recur for left and right sub-trees. 

For example in {1, 7, 5, 50, 40, 10}, 10 is the last element, so we make it root. Now we look for the last element smaller than 10, we find 5. So we know the structure of BST is as following. 

             10
           /    \
          /      \
  {1, 7, 5}       {50, 40}

We recursively follow above steps for subarrays {1, 7, 5} and {40, 50}, and get the complete tree.

Method 2 ( O(n) time complexity ):

The trick is to set a range {min .. max} for every node. Initialize the range as {INT_MIN .. INT_MAX}. The last node will definitely be in range, so create root node. To construct the left subtree, set the range as {INT_MIN …root->data}. If a values is in the range {INT_MIN .. root->data}, the values is part of left subtree. To construct the right subtree, set the range as {root->data .. INT_MAX}.

Following code is used to generate the exact Binary Search Tree of a given post order traversal. 

C++




/* A O(n) program for construction of
BST from postorder traversal */
#include <bits/stdc++.h>
using namespace std;
 
/* A binary tree node has data,
pointer to left child and a
pointer to right child */
struct node
{
    int data;
    struct node *left, *right;
};
 
// A utility function to create a node
struct node* newNode (int data)
{
    struct node* temp =
(struct node *) malloc(sizeof(struct node));
 
    temp->data = data;
    temp->left = temp->right = NULL;
 
    return temp;
}
 
// A recursive function to construct
// BST from post[]. postIndex is used
// to keep track of index in post[].
struct node* constructTreeUtil(int post[], int* postIndex,
                               int key, int min, int max,
                               int size)
{
    // Base case
    if (*postIndex < 0)
        return NULL;
 
    struct node* root = NULL;
 
    // If current element of post[] is
    // in range, then only it is part
    // of current subtree
    if (key > min && key < max)
    {
        // Allocate memory for root of this
        // subtree and decrement *postIndex
        root = newNode(key);
        *postIndex = *postIndex - 1;
 
        if (*postIndex >= 0)
        {
 
        // All nodes which are in range {key..max}
        // will go in right subtree, and first such
        // node will be root of right subtree.
        root->right = constructTreeUtil(post, postIndex,
                                        post[*postIndex],
                                        key, max, size );
 
        // Construct the subtree under root
        // All nodes which are in range {min .. key}
        // will go in left subtree, and first such
        // node will be root of left subtree.
        root->left = constructTreeUtil(post, postIndex,
                                       post[*postIndex],
                                       min, key, size );
        }
    }
    return root;
}
 
// The main function to construct BST
// from given postorder traversal.
// This function mainly uses constructTreeUtil()
struct node *constructTree (int post[],
                            int size)
{
    int postIndex = size-1;
    return constructTreeUtil(post, &postIndex,
                             post[postIndex],
                             INT_MIN, INT_MAX, size);
}
 
// A utility function to print
// inorder traversal of a Binary Tree
void printInorder (struct node* node)
{
    if (node == NULL)
        return;
    printInorder(node->left);
    cout << node->data << " ";
    printInorder(node->right);
}
 
// Driver Code
int main ()
{
    int post[] = {1, 7, 5, 50, 40, 10};
    int size = sizeof(post) / sizeof(post[0]);
 
    struct node *root = constructTree(post, size);
 
    cout << "Inorder traversal of "
        << "the constructed tree: \n";
    printInorder(root);
 
    return 0;
}
 
// This code is contributed
// by Akanksha Rai


C




/* A O(n) program for construction of BST from
   postorder traversal */
#include <stdio.h>
#include <stdlib.h>
#include <limits.h>
 
/* A binary tree node has data, pointer to left child
   and a pointer to right child */
struct node
{
    int data;
    struct node *left, *right;
};
 
// A utility function to create a node
struct node* newNode (int data)
{
    struct node* temp =
        (struct node *) malloc( sizeof(struct node));
 
    temp->data = data;
    temp->left = temp->right = NULL;
 
    return temp;
}
 
// A recursive function to construct BST from post[].
// postIndex is used to keep track of index in post[].
struct node* constructTreeUtil(int post[], int* postIndex,
                         int key, int min, int max, int size)
{
    // Base case
    if (*postIndex < 0)
        return NULL;
 
    struct node* root = NULL;
 
    // If current element of post[] is in range, then
    // only it is part of current subtree
    if (key > min && key < max)
    {
        // Allocate memory for root of this subtree and decrement
        // *postIndex
        root = newNode(key);
        *postIndex = *postIndex - 1;
 
        if (*postIndex >= 0)
        {
 
          // All nodes which are in range {key..max} will go in right
          // subtree, and first such node will be root of right subtree.
          root->right = constructTreeUtil(post, postIndex, post[*postIndex],
                                          key, max, size );
 
          // Construct the subtree under root
          // All nodes which are in range {min .. key} will go in left
          // subtree, and first such node will be root of left subtree.
          root->left = constructTreeUtil(post, postIndex, post[*postIndex],
                                         min, key, size );
        }
    }
    return root;
}
 
// The main function to construct BST from given postorder
// traversal. This function mainly uses constructTreeUtil()
struct node *constructTree (int post[], int size)
{
    int postIndex = size-1;
    return constructTreeUtil(post, &postIndex, post[postIndex],
                             INT_MIN, INT_MAX, size);
}
 
// A utility function to print inorder traversal of a Binary Tree
void printInorder (struct node* node)
{
    if (node == NULL)
        return;
    printInorder(node->left);
    printf("%d ", node->data);
    printInorder(node->right);
}
 
// Driver program to test above functions
int main ()
{
    int post[] = {1, 7, 5, 50, 40, 10};
    int size = sizeof(post) / sizeof(post[0]);
 
    struct node *root = constructTree(post, size);
 
    printf("Inorder traversal of the constructed tree: \n");
    printInorder(root);
 
    return 0;
}


Java




/* A O(n) program for construction of BST from
   postorder traversal */
 
 /* A binary tree node has data, pointer to left child
   and a pointer to right child */
class Node
{
    int data;
    Node left, right;
 
    Node(int data)
    {
        this.data = data;
        left = right = null;
    }
}
 
// Class containing variable that keeps a track of overall
// calculated postindex
class Index
{
    int postindex = 0;
}
 
class BinaryTree
{
    // A recursive function to construct BST from post[].
    // postIndex is used to keep track of index in post[].
    Node constructTreeUtil(int post[], Index postIndex,
            int key, int min, int max, int size)
    {
        // Base case
        if (postIndex.postindex < 0)
            return null;
 
        Node root = null;
 
        // If current element of post[] is in range, then
        // only it is part of current subtree
        if (key > min && key < max)
        {
            // Allocate memory for root of this subtree and decrement
            // *postIndex
            root = new Node(key);
            postIndex.postindex = postIndex.postindex - 1;
 
            if (postIndex.postindex >= 0)
            {
                // All nodes which are in range {key..max} will go in
                // right subtree, and first such node will be root of right
                // subtree
                root.right = constructTreeUtil(post, postIndex,
                        post[postIndex.postindex],key, max, size);
 
                // Construct the subtree under root
                // All nodes which are in range {min .. key} will go in left
                // subtree, and first such node will be root of left subtree.
                root.left = constructTreeUtil(post, postIndex,
                        post[postIndex.postindex],min, key, size);
            }
        }
        return root;
    }
 
    // The main function to construct BST from given postorder
    // traversal. This function mainly uses constructTreeUtil()
    Node constructTree(int post[], int size)
    {
        Index index = new Index();
        index.postindex = size - 1;
        return constructTreeUtil(post, index, post[index.postindex],
                Integer.MIN_VALUE, Integer.MAX_VALUE, size);
    }
 
    // A utility function to print inorder traversal of a Binary Tree
    void printInorder(Node node)
    {
        if (node == null)
            return;
        printInorder(node.left);
        System.out.print(node.data + " ");
        printInorder(node.right);
    }
 
    // Driver program to test above functions
    public static void main(String[] args)
    {
        BinaryTree tree = new BinaryTree();
        int post[] = new int[]{1, 7, 5, 50, 40, 10};
        int size = post.length;
 
        Node root = tree.constructTree(post, size);
 
        System.out.println("Inorder traversal of the constructed tree:");
        tree.printInorder(root);
    }
}
 
// This code has been contributed by Mayank Jaiswal


Python3




# A O(n) program for construction of BST
# from postorder traversal
INT_MIN = -2**31
INT_MAX = 2**31
 
# A binary tree node has data, pointer to
# left child and a pointer to right child
# A utility function to create a node
class newNode:
    def __init__(self, data):
        self.data = data
        self.left = self.right = None
         
# A recursive function to construct
# BST from post[]. postIndex is used
# to keep track of index in post[].
def constructTreeUtil(post, postIndex,
                      key, min, max, size):
 
    # Base case
    if (postIndex[0] < 0):
        return None
 
    root = None
 
    # If current element of post[] is
    # in range, then only it is part
    # of current subtree
    if (key > min and key < max) :
     
        # Allocate memory for root of this
        # subtree and decrement *postIndex
        root = newNode(key)
        postIndex[0] = postIndex[0] - 1
 
        if (postIndex[0] >= 0) :
         
            # All nodes which are in range key..
            # max will go in right subtree, and
            # first such node will be root of
            # right subtree.
            root.right = constructTreeUtil(post, postIndex,
                                           post[postIndex[0]],
                                           key, max, size )
 
            # Construct the subtree under root
            # All nodes which are in range min ..
            # key will go in left subtree, and
            # first such node will be root of
            # left subtree.
            root.left = constructTreeUtil(post, postIndex,
                                          post[postIndex[0]],
                                          min, key, size )
         
    return root
 
# The main function to construct BST
# from given postorder traversal. This
# function mainly uses constructTreeUtil()
def constructTree (post, size) :
 
    postIndex = [size-1]
    return constructTreeUtil(post, postIndex,
                             post[postIndex[0]],
                             INT_MIN, INT_MAX, size)
 
# A utility function to printInorder
# traversal of a Binary Tree
def printInorder (node) :
 
    if (node == None) :
        return
    printInorder(node.left)
    print(node.data, end = " ")
    printInorder(node.right)
 
# Driver Code
if __name__ == '__main__':
    post = [1, 7, 5, 50, 40, 10]
    size = len(post)
 
    root = constructTree(post, size)
 
    print("Inorder traversal of the",
                "constructed tree: ")
    printInorder(root)
 
# This code is contributed
# by SHUBHAMSINGH10


C#




using System;
/* A O(n) program for
construction of BST from
postorder traversal */
 
/* A binary tree node has data,
pointer to left child and a
 pointer to right child */
class Node
{
    public int data;
    public Node left, right;
 
    public Node(int data)
    {
        this.data = data;
        left = right = null;
    }
}
 
// Class containing variable
// that keeps a track of overall
// calculated postindex
class Index
{
    public int postindex = 0;
}
 
public class BinaryTree
{
    // A recursive function to
    // construct BST from post[].
    // postIndex is used to
    // keep track of index in post[].
    Node constructTreeUtil(int []post, Index postIndex,
                    int key, int min, int max, int size)
    {
        // Base case
        if (postIndex.postindex < 0)
            return null;
 
        Node root = null;
 
        // If current element of post[] is in range, then
        // only it is part of current subtree
        if (key > min && key < max)
        {
            // Allocate memory for root of 
            // this subtree and decrement *postIndex
            root = new Node(key);
            postIndex.postindex = postIndex.postindex - 1;
 
            if (postIndex.postindex >= 0)
            {
                // All nodes which are in range
                // {key..max} will go in right subtree,
                // and first such node will be root of
                // right subtree
                root.right = constructTreeUtil(post, postIndex,
                        post[postIndex.postindex], key, max, size);
 
                // Construct the subtree under root
                // All nodes which are in range
                // {min .. key} will go in left
                // subtree, and first such node
                // will be root of left subtree.
                root.left = constructTreeUtil(post, postIndex,
                        post[postIndex.postindex],min, key, size);
            }
        }
        return root;
    }
 
    // The main function to construct
    // BST from given postorder traversal.
    // This function mainly uses constructTreeUtil()
    Node constructTree(int []post, int size)
    {
        Index index = new Index();
        index.postindex = size - 1;
        return constructTreeUtil(post, index,
                        post[index.postindex],
                        int.MinValue, int.MaxValue, size);
    }
 
    // A utility function to print
    // inorder traversal of a Binary Tree
    void printInorder(Node node)
    {
        if (node == null)
            return;
        printInorder(node.left);
        Console.Write(node.data + " ");
        printInorder(node.right);
    }
 
    // Driver code
    public static void Main(String[] args)
    {
        BinaryTree tree = new BinaryTree();
        int []post = new int[]{1, 7, 5, 50, 40, 10};
        int size = post.Length;
 
        Node root = tree.constructTree(post, size);
 
        Console.WriteLine("Inorder traversal of" +
                            "the constructed tree:");
        tree.printInorder(root);
    }
}
 
// This code has been contributed by PrinciRaj1992


Javascript




<script>
 
      /* A O(n) program for
construction of BST from
postorder traversal */
 
      /* A binary tree node has data,
pointer to left child and a
 pointer to right child */
      class Node {
        constructor(data) {
          this.data = data;
          this.left = null;
          this.right = null;
        }
      }
 
      // Class containing variable
      // that keeps a track of overall
      // calculated postindex
      class Index {
        constructor() {
          this.postindex = 0;
        }
      }
 
      class BinaryTree {
        // A recursive function to
        // construct BST from post[].
        // postIndex is used to
        // keep track of index in post[].
        constructTreeUtil(post, postIndex, key, min, max, size) {
          // Base case
          if (postIndex.postindex < 0) return null;
 
          var root = null;
 
          // If current element of post[] is in range, then
          // only it is part of current subtree
          if (key > min && key < max) {
            // Allocate memory for root of
            // this subtree and decrement *postIndex
            root = new Node(key);
            postIndex.postindex = postIndex.postindex - 1;
 
            if (postIndex.postindex >= 0) {
              // All nodes which are in range
              // {key..max} will go in right subtree,
              // and first such node will be root of
              // right subtree
              root.right = this.constructTreeUtil(
                post,
                postIndex,
                post[postIndex.postindex],
                key,
                max,
                size
              );
 
              // Construct the subtree under root
              // All nodes which are in range
              // {min .. key} will go in left
              // subtree, and first such node
              // will be root of left subtree.
              root.left = this.constructTreeUtil(
                post,
                postIndex,
                post[postIndex.postindex],
                min,
                key,
                size
              );
            }
          }
          return root;
        }
 
        // The main function to construct
        // BST from given postorder traversal.
        // This function mainly uses constructTreeUtil()
        constructTree(post, size) {
          var index = new Index();
          index.postindex = size - 1;
          return this.constructTreeUtil(
            post,
            index,
            post[index.postindex],
            -2147483648,
            2147483647,
            size
          );
        }
 
        // A utility function to print
        // inorder traversal of a Binary Tree
        printInorder(node) {
          if (node == null) return;
          this.printInorder(node.left);
          document.write(node.data + " ");
          this.printInorder(node.right);
        }
      }
      // Driver code
      var tree = new BinaryTree();
      var post = [1, 7, 5, 50, 40, 10];
      var size = post.length;
 
      var root = tree.constructTree(post, size);
 
      document.write("Inorder traversal of " +
      "the constructed tree: <br>");
      tree.printInorder(root);
       
</script>


Output

Inorder traversal of the constructed tree: 
1 5 7 10 40 50 

Time Complexity: O(n)

Space Complexity: O(h), where h is the height of the BST

Note that the output to the program will always be a sorted sequence as we are printing the inorder traversal of a Binary Search Tree.

 



Last Updated : 20 Feb, 2023
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