# Algorithm to return length of shortest branch in a binary tree

A binary tree can be encoded using two functions l and r such that for a node n, l(n) give the left child of n , r(n) give the right child of n.

A branch of a tree is a path from the root to a leaf, the length of a branch to a particular leaf is the number of arcs on the path from the root to that leaf.

Let MinBranch(l,r,x) be a simple recursive algorithm for taking a binary tree encoded by the l and r functions together with the root node x for the binary tree and returns the shortest branch of the binary tree.

Please provide the pseudocode for this algorithm.

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Converted the question to wiki since the original author doesn't seem interested in owning it. Some of the answers are worth preserving, though, in my opinion. –  Bill the Lizard Sep 5 '09 at 22:26

I see you've received answers on how to get the length of the shortest branch, but your homework assignment is actually to return the branch itself, presumably as a list of nodes. So, here's executable pseudocode (i.e., Python) to actually return the branch, using `None` to mean null:

``````def MinBranch(l, r, x):
if x is None: return []
left_one = MinBranch(l, r, l(x))
right_one = MinBranch(l, r, r(x))
if len(left_one) < len(right_one):
tail = left_one
else:
tail = right_one
return [x] + tail
``````
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Nice one, Alex. –  hughdbrown Aug 29 '09 at 3:56
@hugh, glad you liked it, and thanks! –  Alex Martelli Aug 29 '09 at 4:06

Look at both branches. Find the length of the shortest path in each. Add one to the smaller and consider it to be the shortest branch.

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That would be essentially writing the code for you - just try translating what I wrote to code :) –  bdonlan Aug 3 '09 at 3:56
rachel: itrue's pseudocode is more or less the same as bdonlan's answer, and Alex Martelli's uses the same idea too. It might be a little hard to follow but draw out a sample tree and try to follow all three answers carefully. You'll probably want to take notes along the way so you don't get lost. Hopefully you will see that all three are doing the same thing (except the distinction of returning the branch itself vs. the length). –  MatrixFrog Aug 3 '09 at 4:00

You can also find it in O(2R) where R is the result. Useful if the tree is very unbalanced or infinite. It is <= O(N).

You can do this with iterative-deepening DFS.

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``````function recurseMin(n)