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Problem Description:

Professor R. Borist studies trees. He has kept a record of the preorder, inorder, and postorder traversals of all of his favorite trees. However, a fire in his office has destroyed the file cabinet where he stored the inorder traversals. He still has the preorder and postorder traversals of all of his favorite trees, is this enough information to reconstruct the missing inorder traversals?

You must design and implement a program for the following task: The input will consist of two lists of numbers. The first list is the preorder traversal of some tree T. The second list is the postorder traversal of the same tree T. The output should be the inorder traversal of T. If the input does not determine a unique tree, then any consistent inorder traversal can be returned.

If it helps in designing your implementation, you can assume that:

  • No tree has more than 1,000 nodes.
  • No tree uses the same label for multiple nodes.
  • Labels of nodes are numbers from 0 to 10,000.

Sample data

2 6 7 1 11 8 5 10 3 4 9
7 8 5 11 10 1 6 4 9 3 2
7 6 8 11 5 1 10 2 4 3 9


Given the preorder & postorder traversals of a tree, can you deduce which element was the root? which elements must have come from the left subtree? from the right subtree? Recurse.

First solve the problem when every node in the tree is guaranteed to have either 2 or 0 children. The case in which some nodes have only 1 child is a little trickier.


In your writeup, you do not need to analyze the efficiency / running time of your solution (this will be a requirement in future projects). But do analyze its correctness; i.e., explain clearly why your algorithm is correct.

The problem I'm having right off the back is understanding how I can build the inorder traversal from the pre and post. I have tried to work out some small examples with 5 and 7 nodes like in the hint but not seeing the pattern. HELP!

UPDATE so I think i figured out how to come up with the inorder traversal form the other two list. I need to know the left subtree right subtree and the root. the root is always at the end of the post order and at the beginning of the pre order. the left sub tree can be found in both list but is easier I think to get from post order cause its in the front. followed by the right subtree and the root. in the in pre order left subtree is after the root followed by the right sub tree. i just need help putting thought into code...

can u pull specific elements out using indexes in ocaml?

i have trouble telling in the list where sub trees begin and end and how to pull the info out and return one list out of the two

like i know x::xs pulls first element out of a list and simple things like that...

can any one help or provide hints and suggestions i have only been considering the one case where i have two or no nodes as children

UPDATE: so i dont have to write the program in coaml i can use what ever language i wnat im familar with java so i would like to implement the solution in java....

i have a good understanding how to get the information needed form pre and post order list to build in order so i think i solved the logic part but need help turning my thought into java code can any one help????

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This seems more like a logic puzzle than an OCaml problem. The key is that nodes are uniquely numbered. The hint seems pretty good: the root of a left subtree of a node is fairly obvious from preorder. The root of a right subtree of a node is fairly obvious from post order. But what does it mean if these turn out to be the same node? You can continue this recursively to get the whole tree (seems like--I haven't actually solved it!). –  Jeffrey Scofield Aug 15 '12 at 21:09

1 Answer 1

Even if the problem description does not explicitely says so, it is clear from the hints that we are dealing with binary trees.

The hint is good: find the root of the tree, then find the root of the left subtree and the root of the right one.

After removing the root, look for a position in the list of nodes where you can cut the list: the nodes before the cut are from the left subtree, the nodes after the cut are from the right subtree.

Working out small examples like you did is a good idea.

To answer specifically "understanding how I can build the inorder traversal from the pre and post": first rebuild the tree from the pre and post traversals, then build the inorder traversal from the tree.

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i think i got a way better understanding of whats going on in the problem and how to build the inorder from the pre and post order tranversals but im having a hard time turning my thought into java code? –  jesse finnneman Aug 27 '12 at 16:41

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