# In-order successor of a Binary Tree

I was writing a code for finding the in-order successor for a binary tree ( NOT A BINARY SEARCH TREE ). It's just a practice problem . More like to brush up tree concepts.

I was doing an in-order traversal and keeping track of the previous node . Whenever the previous node becomes equal to the node whose successor we are searching for , I print the current node .

``````void inOrder(node* root , node* successorFor) {
static node* prev = null;
if(!root)
return;
inOrder(root->left,successorFor);
if(prev == successorFor )
print(root);
prev = root;
inOrder(root->right,successorFor);
}
``````

I was looking for some test cases where my solution might fail ? And whether my approach is correct or not ? If it's not , then how should i go about it ?

-
Where is `prev` defined? – David B Sep 17 '12 at 16:09
I believe the algorithm is right, but does it make sense to print successorFor? Or you're to print root in fact? – Marcus Sep 17 '12 at 16:18
@DavidB Done. it is a static variable. – h4ck3d Sep 17 '12 at 16:18
@Marcus Yes , just a typo , it is root only. I will edit. – h4ck3d Sep 17 '12 at 16:18
Is this C++ or C or Java? It's not all three. – tadman Sep 17 '12 at 16:33

The basic logic of this algorithm is a `tree walk`. You make a call like `print(TREE-SUCCESSOR(root, k).key)`

``````TREE-SUCCESSOR(root, k)
if root == NIL
return NIL
left = TREE-SUCCESSOR(root.left, k)
right = TREE-SUCCESSOR(root.right, k)
successor = NIL
if root.key > k
successor = root
if left
if k < left.key
if successor
if left.key < successor.key
successor = left
else
successor = left
if right
if k < right.key
if successor
if right.key < successor.key
successor = right
else
successor = right
return successor
``````
-
It is just a binary tree , and I need to find the next inorder successor of a node , that is , the next node that i would get during the tree walk after that given node. – h4ck3d Sep 18 '12 at 11:16
This algorithm doesn't assume anything about the position of the successor, that is why there is a recursive call to the left child and also to the right child. – Avi Cohen Sep 18 '12 at 11:26