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Given n, how many structurally unique BST's (binary search trees) that store values 1...n?

For example, Given n = 3, there are a total of 5 unique BST's.

   1         3     3      2      1
    \       /     /      / \      \
     3     2     1      1   3      2
    /     /       \                 \
   2     1         2                 3

I've got this solution:

 * Solution:
 * DP
 * a BST can be destruct to root, left subtree and right subtree.
 * if the root is fixed, every combination of unique left/right subtrees forms
 * a unique BST.
 * Let a[n] = number of unique BST's given values 1..n, then
 * a[n] = a[0] * a[n-1]     // put 1 at root, 2...n right
 *      + a[1] * a[n-2]     // put 2 at root, 1 left, 3...n right
 *      + ...
 *      + a[n-1] * a[0]     // put n at root, 1...n-1 left
int numTrees(int n) {
    if (n < 0) return 0;
    vector<int> trees(n+1, 0);
    trees[0] = 1;

    for(int i = 1; i <= n; i++) 
        for (int j = 0; j < i; j++) 
            trees[i] += trees[j] * trees[i-j-1];

    return trees[n];

Because this answer was given out too long ago to touch this 'dragonmigo' guy. This solution is accepted and my problem is:

In the comment, trees[0] refers to case 1. (0+1 = 1)

If so, trees[n-1] should refer to case 1...n rather than the case 2...n. (n-1+1=n)

Is my thinking wrong?

p.s. I know this is actually a Catalan number and I know the algorithm using the deduction formula to solve it.

share|improve this question
Can you explain clearly what you want to ask? It is Catalan Number. Do you want it's proof or anything else? –  Jerky Jul 15 at 13:18
That's not my point. My point is the definition of trees[n] in comment conflicts with the actual meaning of trees[n] in code. –  Lancelod Jul 16 at 1:57
Just like this Let a[n] = number of unique BST's given values 1..n then what should a[0] represent for? –  Lancelod Jul 16 at 2:18

1 Answer 1

up vote 3 down vote accepted

trees[n] is the number of trees with exactly n nodes. There is 1 trees with 0 nodes, hence trees[0] == 1. For a given n > 0 there is a root node and two children trees whose total size is: n-1

  • trees[n-1] possible trees on the left and trees[0] on the right
  • trees[n-2] possible trees on the left and trees[1] on the right
  • ...
  • trees[1] possible trees on the left and trees[n-1-1] on the right
  • trees[0] possible trees on the left and trees[n-1] on the right

When you have trees[k] possible trees on the left, and trees[l] on the right, it makes trees[k]*trees[l] possible combinations. This means:

trees[n] = trees[n-1]*trees[0]
         + trees[n-2]*trees[1]
         + ...
         + trees[1]*trees[n-2]
         + trees[0]*trees[n-1]

The outer loop compute all trees[n]. The inner loop compute each of these using the decomposition I shown above (and the computations of all the values before n).

share|improve this answer
It seems that trees[n-1] possible trees on the left and trees[0] on the right will lead to a result of n-1 + 0 = n-1 nodes and so will the other parts. This alg considers of n possible conditions like: (1 node, n-1 nodes), (2 nodes, n-2 nodes), ..., (n-1 nodes, 1 nodes), doesn't it? –  Lancelod Jul 16 at 2:18
@Lancelod, No because: trees[0] is 1 not 0 and because k possible trees on left and l possible trees on the right result in k*l trees instead of k+l. The reason is for every single left tree, out of the k possible trees, you have l possible trees on the right. –  fjardon Jul 16 at 7:43
I've got your point of k x l. It's my bad not explaining what confuses me is that in the comment, code's author wrote "Let a[n] = number of unique BST's given values 1..n", and this makes the meaning of a[0] unclear(1..0?). Yes, my focus is how to describe what a[0] means? You say it means 1 possible trees and as you know case 0 node leads to 1 possible trees and case 1 node leads to 1 possible trees too. What actually does this 1 possible trees comes from? Thanks! –  Lancelod Jul 16 at 11:07
@Lancelod I think it's clear there is only 1 tree made of 1 node. The tricky case is understanding why there is 1 tree made of 0 node. I don't have a good philosophical reason for that. It's just convenient to use this value because it makes the other computations correct and possible, the same way we define 0! = 1 and x^0 = 1. If you think about it, why does the product of 0 factors equals 1 ? The only reason is that it makes the other computations correct using a unique rule. –  fjardon Jul 16 at 11:37
thanks for the patient explanation of 0. :), yet I understand why 0 node could be 1 case. It seems that only when we define a[0] as the case number of '0 node' and a[n-1] as the case number of 'n-1 nodes', this definition would have no conflicts with itself. Well, if that so, how could combination of case '0 node' and case 'n-1 nodes' be a part of all cases of 'n nodes'? As you can see, the node number is not compatible. –  Lancelod Jul 16 at 12:49

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