# Representing a Binary Tree in a file

What are the different strategies involved in representing Binary tree in a file so that the tree structure can be recreated easily?I am using C.

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What have you tried so far? –  Shamim Hafiz Jan 10 '12 at 10:40
I think your question is too vague. In Java I guess you could use `Serializable`. –  foobar Jan 10 '12 at 10:41
Question is quite ambiguous, can you be more precise! –  Pratik Jan 10 '12 at 10:42
I will be creating a binary tree using a c program and I need to store the tree structure on to a file so that I can recreate the tree again some other time by reading from the file. –  PaulDaviesC Jan 10 '12 at 10:45
@PaulDC You can store the tree as (value, leftsubtree, rightsubtree) format. Eg. (1, (2, (4, NULL, NULL), (5, NULL, NULL)), (3, (6, NULL, NULL), (7, NULL, NULL))) to store a simple tree that has 1 as root, 2&3 as second level nodes and 4,5,6&7 as leaves. It is O(n) to write and O(n) to read the tree. Let me know if you need the complete algorithm. –  ElKamina Jan 10 '12 at 17:44

Store the inorder and preorder traversal of the tree in the file. Any binary tree can be reconstructed by inorder and preorder traversals[1].

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I would suggest

1) heap like data structure (heap)

1_2_3_4_5_6_7

"_" is used as a delimiter between elements

Suppose we constructing Binary tree Nodes from array:

``````List<Node> auxiliary = new ArrayList<Node>();
int mV = Integer.MIN_VALUE;
int[] bst = { 15, 6, 18, 3, 7, 17, 20, 2, 4, mV, 13, mV, mV, mV, mV, mV, mV, mV, mV, mV, mV, 9, mV, mV, mV, mV, mV, mV, mV, mV, mV };

Node fake = new Node(mV);

for (int i = 1; i <= bst.length; i++) {

if (bst[i - 1] == mV) {
continue;
}

Node cur = new Node(null, null, bst[i - 1]);

int parentNodeIndex = i / 2;
if (parentNodeIndex == 0) {
continue;
}
boolean left = (i % 2) == 0;

Node parent = auxiliary.get(parentNodeIndex - 1);
cur.parent = parent;

if (left) {
parent.left = cur;
} else {
parent.right = cur;
}
}
``````

1) indentation:

1
.2
..3
..4
.5
..6
..7

If element is missing use special character instead

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Here's a naive way, assuming you have something like:

``````struct bst {
int val;
struct bst *left; // NULL when no node
struct bst *right;
}
``````

Make another struct like so:

``````struct bst_serial {
int val;
int left; // NULL when no node
int right;
}
``````

Then, malloc an array of `bst_serial`s that is as large as your tree:

``````struct bst_serial *serial_bst = malloc(sizeof(struct bst_serial) * tree_size);
``````

Now, do a traversal of the tree like so (untested):

``````int current_pos = 0;

int convert_node(bst *root) {
int this_pos = current_pos;
current_pos++;

serial_bst[this_pos].val = root->val;
if(root->left != NULL) {
serial_bst[this_pos].left = convert_node(root->left);
} else {
serial_bst[this_pos].left = -1;
}

if(root->right != NULL) {
serial_bst[this_pos].right = convert_node(root->right);
} else {
serial_bst[this_pos].right = -1;
}
return this_pos;
}
``````

You can now `write()` the array out to disk. If you write functions to traverse the `bst_serial` type of tree, then you don't even need to deserialise it - you can just `mmap()` it. For extra points, don't even use the pointer tree in the first place - create and grow the `bst_serial` array as you create the binary tree. Then your code doesn't need to care whether it's dealing with a tree from disk or a tree you've just created.

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You will need atleast 2 traversals of the tree in order to be able to construct the exact tree.Because there can be more than one unique tree possible from one given traversal.

For example -you can store the inorder and preorder traversals of a binary tree into your text file and follow the below link to work it out from there while recreating the tree.

http://leetcode.com/2011/04/construct-binary-tree-from-inorder-and-preorder-postorder-traversal.html

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Do an in-order traversal, and write the value of the node to the file delimeted with new lines. If a node is a leaf store a special character (e.g. #) after the leaf value.

When you read the file, until you don't get a '#' insert values, and descend to the left. If you get '#' ascend until there are no elements to the right, and descend to right. Do this recursively.

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Sorry it wouldn't preserve your original tree. It would preserve only a correct binary seach tree with the same numbers. –  WebMonster Jan 10 '12 at 11:10
By descend to left you mean, attach a child to the left, right? Then what do you mean by ascend? –  PaulDaviesC Jan 10 '12 at 11:19
If a node has no right-child this would not work. You need to put extra # for this case. –  Irit Katriel Jan 10 '12 at 15:22