Given a binary tree of 0s and 1s, the task is to find the maximum number of 1s in any path in the tree. The path may start and end at any node in the tree.
Example:
Input: 1 / \ 0 1 / \ 1 1 / \ 1 0 Output: 4
Approach:
- A function countUntil has been created which returns the maximum count of 1 in any vertical path below that node.
- This path must be a single path and this path must include at-most one child of the node as well as its itself. i.e countUntil returns the max count of 1 in either left child or right child and also includes itself in count if its value is 1.
- So, from any node countUntil(node->left) + countUntil(node->right) + node->value will give the number of 1s in the path which contains the node and its left and right path and no ancestor of the node is considered.
- Taking the maximum of all nodes will give the required answer.
Below is the implementation of the above approach
C++
// C++ implementation of the above approach #include <bits/stdc++.h> using namespace std;
// A binary tree node struct Node {
int data;
struct Node *left, *right;
}; // A utility function to allocate a new node struct Node* newNode( int data)
{ struct Node* newNode = new Node;
newNode->data = data;
newNode->left = newNode->right = NULL;
return (newNode);
} // This function updates overall count of 1 in 'res' // And returns count 1s going through root. int countUntil(Node* root, int & res)
{ // Base Case
if (root == NULL)
return 0;
// l and r store count of 1s going through left and
// right child of root respectively
int l = countUntil(root->left, res);
int r = countUntil(root->right, res);
// maxCount represents the count of 1s when the Node under
// consideration is the root of the maxCount path and no
// ancestors of the root are there in maxCount path
int maxCount;
// if the value at node is 1 then its
// count will be considered
// including the leftCount and the rightCount
if (root->data == 1)
maxCount = l + r + 1;
else
maxCount = l + r;
// Store the Maximum Result.
res = max(res, maxCount);
// return max count in a single path.
// This path must include at-most one child
// of the root as well as itself
// if the value at node is 1
// then its count will be considered
// including the maximum of leftCount or the rightCount
if (root->data == 1)
return max(l, r) + 1;
else
return max(l, r);
} // Returns maximum count of 1 in any path // in tree with given root int findMaxCount(Node* root)
{ // Initialize result
int res = INT_MIN;
// Compute and return result
countUntil(root, res);
return res;
} // Driver program int main( void )
{ struct Node* root = newNode(1);
root->left = newNode(0);
root->right = newNode(1);
root->left->left = newNode(1);
root->left->right = newNode(1);
root->left->right->left = newNode(1);
root->left->right->right = newNode(0);
cout << findMaxCount(root);
return 0;
} |
Java
// Java implementation of the above approach class GFG
{ // A binary tree node
static class Node
{
int data;
Node left, right;
};
static int res;
// A utility function to allocate a new node
static Node newNode( int data)
{
Node newNode = new Node();
newNode.data = data;
newNode.left = newNode.right = null ;
return (newNode);
}
// This function updates overall count of 1 in 'res'
// And returns count 1s going through root.
static int countUntil(Node root)
{
// Base Case
if (root == null )
return 0 ;
// l and r store count of 1s going through left and
// right child of root respectively
int l = countUntil(root.left);
int r = countUntil(root.right);
// maxCount represents the count of 1s when the Node under
// consideration is the root of the maxCount path and no
// ancestors of the root are there in maxCount path
int maxCount;
// if the value at node is 1 then its
// count will be considered
// including the leftCount and the rightCount
if (root.data == 1 )
maxCount = l + r + 1 ;
else
maxCount = l + r;
// Store the Maximum Result.
res = Math.max(res, maxCount);
// return max count in a single path.
// This path must include at-most one child
// of the root as well as itself
// if the value at node is 1
// then its count will be considered
// including the maximum of leftCount or the rightCount
if (root.data == 1 )
return Math.max(l, r) + 1 ;
else
return Math.max(l, r);
}
// Returns maximum count of 1 in any path
// in tree with given root
static int findMaxCount(Node root)
{
// Initialize result
res = Integer.MIN_VALUE;
// Compute and return result
countUntil(root);
return res;
}
// Driver program
public static void main(String[] args)
{
Node root = newNode( 1 );
root.left = newNode( 0 );
root.right = newNode( 1 );
root.left.left = newNode( 1 );
root.left.right = newNode( 1 );
root.left.right.left = newNode( 1 );
root.left.right.right = newNode( 0 );
System.out.print(findMaxCount(root));
}
} // This code is contributed by 29AjayKumar |
Python3
# Python implementation of the above approach # A binary tree node class Node:
def __init__( self ):
self .data = 0
self .left = None
self .right = None
# A utility function to allocate a new node def newNode(data):
newNode = Node()
newNode.data = data
newNode.left = newNode.right = None
return (newNode)
res = 0
# This function updates overall count of 1 in 'res' # And returns count 1s going through root. def countUntil( root):
global res
# Base Case
if (root = = None ):
return 0
# l and r store count of 1s going through left and
# right child of root respectively
l = countUntil(root.left)
r = countUntil(root.right)
# maxCount represents the count of 1s when the Node under
# consideration is the root of the maxCount path and no
# ancestors of the root are there in maxCount path
maxCount = 0
# if the value at node is 1 then its
# count will be considered
# including the leftCount and the rightCount
if (root.data = = 1 ):
maxCount = l + r + 1
else :
maxCount = l + r
# Store the Maximum Result.
res = max (res, maxCount)
# return max count in a single path.
# This path must include at-most one child
# of the root as well as itself
# if the value at node is 1
# then its count will be considered
# including the maximum of leftCount or the rightCount
if (root.data = = 1 ):
return max (l, r) + 1
else :
return max (l, r)
# Returns maximum count of 1 in any path # in tree with given root def findMaxCount(root):
global res
# Initialize result
res = - 999999
# Compute and return result
countUntil(root)
return res
# Driver program root = newNode( 1 )
root.left = newNode( 0 )
root.right = newNode( 1 )
root.left.left = newNode( 1 )
root.left.right = newNode( 1 )
root.left.right.left = newNode( 1 )
root.left.right.right = newNode( 0 )
print (findMaxCount(root))
# This code is contributed by Arnab Kundu |
C#
// C# implementation of the above approach using System;
class GFG
{ // A binary tree node
class Node
{
public int data;
public Node left, right;
};
static int res;
// A utility function to allocate a new node
static Node newNode( int data)
{
Node newNode = new Node();
newNode.data = data;
newNode.left = newNode.right = null ;
return (newNode);
}
// This function updates overall count of 1 in 'res'
// And returns count 1s going through root.
static int countUntil(Node root)
{
// Base Case
if (root == null )
return 0;
// l and r store count of 1s going through left and
// right child of root respectively
int l = countUntil(root.left);
int r = countUntil(root.right);
// maxCount represents the count of 1s when the Node under
// consideration is the root of the maxCount path and no
// ancestors of the root are there in maxCount path
int maxCount;
// if the value at node is 1 then its
// count will be considered
// including the leftCount and the rightCount
if (root.data == 1)
maxCount = l + r + 1;
else
maxCount = l + r;
// Store the Maximum Result.
res = Math.Max(res, maxCount);
// return max count in a single path.
// This path must include at-most one child
// of the root as well as itself
// if the value at node is 1
// then its count will be considered
// including the maximum of leftCount or the rightCount
if (root.data == 1)
return Math.Max(l, r) + 1;
else
return Math.Max(l, r);
}
// Returns maximum count of 1 in any path
// in tree with given root
static int findMaxCount(Node root)
{
// Initialize result
res = int .MinValue;
// Compute and return result
countUntil(root);
return res;
}
// Driver program
public static void Main(String[] args)
{
Node root = newNode(1);
root.left = newNode(0);
root.right = newNode(1);
root.left.left = newNode(1);
root.left.right = newNode(1);
root.left.right.left = newNode(1);
root.left.right.right = newNode(0);
Console.Write(findMaxCount(root));
}
} // This code is contributed by PrinciRaj1992 |
Javascript
<script> // JavaScript implementation of the above approach // A binary tree node class Node { constructor()
{
this .left = null ;
this .data = 0;
this .right = null ;
}
}; var res = 0;
// A utility function to allocate a new node function newNode(data)
{ var newNode = new Node();
newNode.data = data;
newNode.left = newNode.right = null ;
return (newNode);
} // This function updates overall count of 1 in 'res' // And returns count 1s going through root. function countUntil(root)
{ // Base Case
if (root == null )
return 0;
// l and r store count of 1s going through left and
// right child of root respectively
var l = countUntil(root.left);
var r = countUntil(root.right);
// maxCount represents the count of 1s when the Node under
// consideration is the root of the maxCount path and no
// ancestors of the root are there in maxCount path
var maxCount;
// if the value at node is 1 then its
// count will be considered
// including the leftCount and the rightCount
if (root.data == 1)
maxCount = l + r + 1;
else
maxCount = l + r;
// Store the Maximum Result.
res = Math.max(res, maxCount);
// return max count in a single path.
// This path must include at-most one child
// of the root as well as itself
// if the value at node is 1
// then its count will be considered
// including the maximum of leftCount or the rightCount
if (root.data == 1)
return Math.max(l, r) + 1;
else
return Math.max(l, r);
} // Returns maximum count of 1 in any path // in tree with given root function findMaxCount(root)
{ // Initialize result
res = -1000000000;
// Compute and return result
countUntil(root);
return res;
} // Driver program var root = newNode(1);
root.left = newNode(0); root.right = newNode(1); root.left.left = newNode(1); root.left.right = newNode(1); root.left.right.left = newNode(1); root.left.right.right = newNode(0); document.write(findMaxCount(root)); </script> |
Output:
4
Time Complexity: O(n)
where n is number of nodes in Binary Tree.