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binary tree, where each node has at most two child nodes, child nodes may contain references to their parents.

we do not differentiate the nodes and all nodes are considered identical. How can we find the number of different binary trees that can be formed with N identical nodes.

eg: if 3 nodes then 5 diff trees
if 7 nodes then 429 trees

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3  
Hint: Google for "Catalan numbers" –  Bart Kiers Jan 16 '11 at 11:20
    
@Bart Kiers, I think, the question is not about Catalan numbers, because there is no catalan number which equals to 5 (see the OPs sample). or I think so for 429 –  Saeed Amiri Jan 16 '11 at 11:59
    
why the [c] tag? –  Jens Gustedt Jan 16 '11 at 12:08
    
@Saeed, you're wrong. The first few Catalan numbers are: 1, 1, 2, 5, 14, 42, 132, 429, 1430, ... –  Bart Kiers Jan 16 '11 at 12:34

3 Answers 3

up vote 0 down vote accepted

Now, if you really want to understand this, instead of just getting (or experimenting to find) the answer, you can check out "The Art of Computer Programming", Volume 4, Fascicle 4: Generating all trees.

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THanks a lot. will check it out, –  JackieBoy Jan 16 '11 at 12:01

recursion is your friend!

pseudo-code:

numOfTrees(n):
  return trees(n).size();

trees(n):
  if (n==1)
    return new list of single node;

  big_trees = new empty list;

  for (small_tree : trees(n-1))
    for (big_tree : addSingleNode(tree))
      big_trees.insert(big_tree);

  return big_trees;

addSingleNode(tree):
  trees = new empty list;

  for (leaf : getLeaves(tree)) {
    trees.insert(tree.clone().addLeftChild(leaf, node));
    trees.insert(tree.clone().addRightChild(leaf, node));
  }

  return trees;

getLeaves() is implementation dependant, if you have a linked list with all leaves, then it will be quick, otherwise you might have to traverse the tree checking for leaves (which is O(n) in_order).

not very memory efficient, but it solves the problem by simple recursion, where at every stage i take the trees and go over all the leaves and add my new node in every possible way.

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I didn't think enough about correctness of your recursion algorithm, but as I can see you try constructive way, but if the number of trees are exponential with n, your algorithm is not good choice. –  Saeed Amiri Jan 16 '11 at 12:02

(2n)!/[(n+1)!*n!]

have a look at:

http://www.theory.csc.uvic.ca/~cos/inf/tree/BinaryTrees.html

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Thanks. This is the formula for catalan. –  JackieBoy Jan 16 '11 at 12:02

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