# generate all structurally distinct full binary trees with n leaves

This is a homework, I have difficulties in thinking of it. Please give me some ideas on recursions and DP solutions. Thanks a lot

generate and print all structurally distinct full binary trees with n leaves in dotted parentheses form， "full" means all internal (non-leaf) nodes have exactly two children.

For example, there are 5 distinct full binary trees with 4 leaves each.

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Please say what you have tried already, and what websites or other documentation you have read to try to understand the issue. –  Alex Brown Sep 6 '12 at 3:31
Clarification please. Do the leaf-bearing nodes have to sprout exactly two leaves? If so then n must be even. Can you give an example of what your teacher means by dotted parentheses form? –  Jive Dadson Sep 6 '12 at 3:33
Your accept rate needs some work. –  Vaughn Cato Sep 6 '12 at 3:52
There are a number of definitions of a "full tree," but this is not any of them. A more usual definition is that all leaves are within one level of each other. According to your definition, a tree with all the left nodes as leaves and all the right nodes as non-leaves (except the last one) would be considered "full"... –  BlueRaja - Danny Pflughoeft Sep 6 '12 at 3:52
When generating the possibilities for four leaves, think about the possibilities for three leaves. Can you use the list of possibilities for three leaves to help you do four? –  Vaughn Cato Sep 6 '12 at 3:57
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U can use recursion, on i-th step u consider i-th level of tree and u chose which nodes will be present on this level according to constraints: - there is parent on previous level - no single children present (by your definition of "full" tree)

recursion ends when u have exactly N nodes.

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I do not quite get what you said. Would you please walk me through more in detail? Thanks a lot! –  lxx22 Sep 6 '12 at 20:40
@lxx22, what exactly is unclear, details on implementation? –  Herokiller Sep 14 '12 at 7:35

This looks like a dynamic programming problem. In Python you could do this

``````def gendistinct(n):
leafnode = '(.)'
dp = []
newset = set()
dp.append(newset)
for i in range(1,n):
newset = set()
for j in range(i):
for leftchild in dp[j]:
for rightchild in dp[i-j-1]:
newset.add('(' + '.' + leftchild + rightchild + ')')
dp.append(newset)
return dp[-1]

alltrees = gendistinct(4)
for tree in alltrees:
print tree
``````
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I don't see an obvious way to do it with recursion, but no doubt there is one.

Rather, I would try a dynamic programming approach.

Note that under your definition of full tree, a tree with n leaves has n-1 internal nodes. Also note that the trees can be generated from smaller trees by joining together at the root two trees with sizes 1 to n-1 leaves on the left with n-1 to 1 leaves on the right.

Note also that the "trees" of various sizes can be stored as dotted parenthesis strings. To build a new tree from these, concatenate ( Left , Right ).

So start with the single tree with 1 leaf (that is, a single node). Build the lists of trees of increasing size up to n. To build the list of k-leaf trees, for each j = 1 to k-1, for each tree of j leaves, for each tree of k-j leaves, concatenate to build the tree (with k leaves) and add to the list.

As you build the n-leaf trees, you can print them out rather than store them.

There are 5*1 + 2*1 + 1*2 + 1*5 = 14 trees with 5 leaves.

There are 14*1 + 5*1 + 2*2 + 1*5 + 1*14 = 42 trees with 6 leaves.

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Thank you UncleO. Allow me to summarize the Dynamic Programming: –  lxx22 Sep 6 '12 at 19:55