Is there any result known about counting the number of (unlabeled) ordered trees which follow a given unordered degree sequence?
Here an ordered tree is understood as a rooted tree in which the order of the subtrees is significant.
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$\begingroup$ Ordered in what sense? Gerhard "Ask Me About System Design" Paseman, 2012.03.18 $\endgroup$– Gerhard PasemanCommented Mar 19, 2012 at 1:22
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$\begingroup$ @Gerhard Paseman An ordered tree is a rooted tree in which the order of the subtrees is significant. $\endgroup$– marcCommented Mar 19, 2012 at 1:24
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$\begingroup$ And how is the degree sequence given? is it ordered as well? Or is it just a multiset? Gerhard "Ask Me About System Design" Paseman, 2012.03.18 $\endgroup$– Gerhard PasemanCommented Mar 19, 2012 at 3:35
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$\begingroup$ @Gerhard Paseman sorry for the unclear specification: The degree sequence is ordered as well $\endgroup$– marcCommented Mar 19, 2012 at 4:10
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1$\begingroup$ so would degree sequence 2,1,3,4,5,1,1,1,1,1,1,1 mean the root has two children, the one on the left is a leaf and the one on the right has two children , one with 3 leaves on it and one with 4? That would uniquely specify the tree so it must not be that. Can you give an example? $\endgroup$– Aaron MeyerowitzCommented Mar 19, 2012 at 6:03
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2 Answers
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Is Theorem 6.4 of http://people.brandeis.edu/~gessel/homepage/papers/enum.pdf what you want?
