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.

Let a[n] = number of unique BST's given values 1..nthen what should a[0] represent for? – Lancelod Jul 16 at 2:18