# Finding if a Binary Tree is a Binary Search Tree

Today I had an interview where I was asked to write a program which takes a Binary Tree and returns true if it is also a Binary Search Tree otherwise false.

My Approach1: Perform an inroder traversal and store the elements in O(n) time. Now scan through the array/list of elements and check if element at ith index is greater than element at (i+1)th index. If such a condition is encountered, return false and break out of the loop. (This takes O(n) time). At the end return true.

But this gentleman wanted me to provide an efficient solution. I tried but I was unsuccessfult, because to find if it is a BST I have to check each node.

Moreover he was pointing me to think over recusrion. My Approach 2: A BT is a BST if for any node N N->left is < N and N->right > N , and the INorder successor of left node of N is less than N and the inorder successor of right node of N is greater than N and the left and right subtrees are BSTs.

But this is going to be complicated and running time doesn't seem to be good. Please help if you know any optimal solution.

Thanks.

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An inorder traversal already gives you the values in the order they would appear in the array, so you don't need to copy the whole tree, you just need to keep track of the last value encountered, so it can be compared with the current one. –  shambulator May 31 '12 at 11:31
Wow! this is true, I probably dont need the array, even then the order is O(n) –  dharam May 31 '12 at 11:35
Can you define what your interviewer meant by "efficient"? Did he mean time or space? I tend to agree with you that you can't do it without checking each node, but you don't need the array. –  shambulator May 31 '12 at 11:38
He wanted me to optimize this in terms of time. I think it can't be done in less than O(n) –  dharam May 31 '12 at 11:42
He wants you to tell him that it cannot be done in less than O(n) :-) and if someone claims it can, one can exchange one of the nodes that wasn't checked by a BST-destroying value to show him wrong. (Don't forget that it's fair to ask impossible things in interviews ;) –  Frank May 31 '12 at 12:15
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## 6 Answers

It's a pretty well-known problem with the following answer:

``````public boolean isValid(Node root) {
return isValidBST(root, Integer.MIN_VALUE,
Integer.MAX_VALUE);
}
private boolean isValidBST(Node node, int MIN, int MAX) {
if(node == null)
return true;
if(node.value > MIN
&& node.value < MAX
&& isValidBST(node.left, MIN, node.value)
&& isValidBST(node.right, node.value, MAX))
return true;
else
return false;
}
``````

The recursive call makes sure that subtree nodes are within the range of its ancestors, which is important. The running time complexity will be O(n) since every node is examined once.

The other solution would be to do an inorder traversal and check if the sequence is sorted, especially since you already know that a binary tree is provided as an input.

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I think that the second approach is right. The tree can be traversed in a recursive manner. On each iteration lower and upper bounds of current subtree can be stored. If we want to check subtree with root x, and bounds for the subtree are l and h, then all we need is to check that l <= x <= h and to check the left subtree with bounds l and x, and the right one with bounds x and h.

This will have O(n) complexity, because we start from the root and each node is checked only once as root of some subtree. Also, we need O(h) memory for recursive calls, where h is the height of the tree.

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Can you please elaborate and explain the Running time complexity of this approach. According to me its greater than O(n). But I am not sure. –  dharam May 31 '12 at 11:27
So, according to you this is still going to take O(n). I was asked to optimize it. –  dharam May 31 '12 at 11:37
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``````Here is another Solution which uses 2 helper functions to calculate for each node the min and max value in the subtree using the helper function minValue and maxValue

int isBST(struct node* node)
{
if (node == NULL)
return(true);

/* false if the max of the left is > than us */
if (node->left!=NULL && maxValue(node->left) > node->data)
return(false);

/* false if the min of the right is <= than us */
if (node->right!=NULL && minValue(node->right) < node->data)
return(false);

/* false if, recursively, the left or right is not a BST */
if (!isBST(node->left) || !isBST(node->right))
return(false);

/* passing all that, it's a BST */
return(true);
}
``````
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Isn't that traversing the tree twice? –  Jack Jun 10 '12 at 5:49
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``````boolean b = new Sample().isBinarySearchTree(n1, Integer.MIN_VALUE, Integer.MAX_VALUE);
.......
.......
.......
public boolean isBinarySearchTree(TreeNode node, int min, int max)
{

if(node == null)
{
return true;
}

boolean left = isBinarySearchTree(node.getLeft(), min, node.getValue());
boolean right = isBinarySearchTree(node.getRight(), node.getValue(), max);

return left && right && (node.getValue()<max) && (node.getValue()>=min);

}
``````

Comments are invited. Thanks.

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There are some examples above using INTEGER.MAX AND MIN I cant see a reason to pass them and the significance of it, correct me if I am wrong in anyway or explain me the reason.

More over binary search tree may have objects which are compared by compareTo method or Coperator.. ( hence Integer.MIN and Integer.MAX dont fit on that model) I am writing a code where it returns true or false one has to call (root_node,true) and it will return true if it is a bst else false

``````void boolean isBSt( node root_node, boolean passed_root)
{

if ( node==null){
if ( passed_root)
return false;
// you have passed null pointer as
//root of the tree , since there is no
// valid start point we can throw an exception or return false
return true;
}

if( node.right !=null )
if ( node.right.data <= node.data)
return false;

if ( node.left !=null )
if ! ( node.left.data <= node.data)
return false;

return ( isBST( node.right , false) && isBST( node.left, false ) )

}
``````
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The MIN and MAX is just to avoid a corner case and make that recursive call look symmetric. –  dharam May 21 '13 at 8:59
yaa I understood.. why it is like that.. –  user2398113 May 22 '13 at 7:40
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Have a look at this solution: http://preparefortechinterview.blogspot.com/2013/09/am-i-bst.html

It explains different ways and gives you a generic and efficient method too. Hope it helps.

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