I came across a problem that really interested me, but I am not sure I fully understand how to complete the task at hand: Design an algorithm to construct a binary tree from two n-long sequences, known to be the output of in-order and post-order traversals of the same binary tree.
I've managed to complete that much so far. Below is my (relevant) code so far, however I also would like to be able to identify sequences for which no binary tree exists. I'm not sure how to check for this. Can someone give me a nudge in the right direction?
node* build_tree(int in[], int inStart, int inEnd,
int post[], int postStart, int postEnd) {
if(inStart > inEnd || postStart > postEnd)
return NULL;
int rootValue = post[postEnd];
node *tNode = new_node(rootValue);
// find the index of this node in in-order traversal
int inIndex = search(in, inStart, inEnd, rootValue);
// Using index in in-order traversal, construct left and right subtrees
tNode->left = build_tree(in, inStart, inIndex-1, post, postStart, postStart+inIndex-(inStart+1));
tNode->right = build_tree(in, inIndex+1, inEnd, post, postStart + inIndex - inStart, postEnd - 1);
return tNode;
}
// Function to find index of value in arr[start...end]
// The function assumes that value is present in in[]
int search(int arr[], int start, int end, int value) {
int i;
for(i = start; i < end; i++) {
if(arr[i] == value)
return i;
}
return i;
}
// function that allocates a new node with the
// given data and NULL left and right pointers
node* new_node(int data) {
node* n = (node*)malloc(sizeof(node));
n->data = data;
n->left = NULL;
n->right = NULL;
return n;
}