# Number of BST's given a linked list of numbers

Suppose I have a linked list of positive numbers, how many BST's can be generated from them, provided all nodes all required to form the tree?

Conversely, how many BST's can be generated, provided any number of the linked list nodes can exist in these trees?

Bonus: how many balanced BST's can be formed? Any help or guidance is greatly appreciated.

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What have you tried? –  quasiverse Feb 11 '12 at 6:03
okay, so an inorder traversal of BST's leads a sorted list right? so i thought that we could decompose the qn to "how many ways can a linked list be sorted". that would be nCn + nC(n-1) + ... + nC1, which would be the answer to the second question. the answer to the first qn would be n. third qn, im not entirely sure. –  OckhamsRazor Feb 11 '12 at 6:40
possible duplicate of Determine number of possible tree from given Nodes –  Raymond Chen Feb 11 '12 at 8:14

You can use dynamic programming to compute that.

Just note that it doesn't matter what the numbers are, just how many. In other words for any n distinct integers there is the same amount of different BSTs. Let's call this number f(n).

Then if you know f(k) for k < n, you can get f(n):

``````f(n) = Sum ( f(i) + f(n-1-i), i = 0,1,2,...,n-1 )
``````

Each summand represents the number of trees for which the (1+i)-th smallest number is at the root (thus in the left subtree where are i numbers and in the right subtree there are n-1-i). So DP solves this.

Now the total number of BSTs (with any nodes from the list) is just a sum:

``````Sum ( Binomial(n,k) * f(k), k=1,2,3,...,n )
``````

This is because you can pick k of them in `Binomial(n,k)` ways and then you know that there are `f(k)` BSTs for them.

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