Suppose preorder and postorder traversals and k are given. How many kary trees are there with these traversals?
An kary tree is a rooted tree for which each vertex has at most k children.
Suppose preorder and postorder traversals and k are given. How many kary trees are there with these traversals? An kary tree is a rooted tree for which each vertex has at most k children. 


It depends on the particular traversal pair. For instance
describes only one possible tree (the fewest possible, unless you include inconsistent traversal pairs). On the other hand:
describes 2^(31) = 4 trees (the most possible amongst all scenarios where the traversals have 3 nodes and k can be anything), namely the 4 3node lines. 


If you want to know the number of possible binary trees having Preorder and Postorder traversals, you should first draw one possible tree. then count the number of nodes with only one child. The total number of possible trees would be : 2^(Number of singlechild nodes) as an example: pre: adbefgchij post: dgfebijhca i draw one tree that has 3 singlechild nodes. So , the number of possible trees is 8. 


First determine the corresponding range of subtree by DFS, and get the amount of subtree, then solve it through combination of the subtrees.


