Counting Rooted Trees: The Universal Law $t(n)\,\sim\,C \rho^{-n} n^{-3/2}$

Jason P. Bell,Karen A. Yeats,Stanley N. Burris

doi:10.37236/1089

Counting Rooted Trees: The Universal Law $t(n)\,\sim\,C \rho^{-n} n^{-3/2}$

Jason P. Bell, Karen A. Yeats + Show 1 more

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Journal: The Electronic Journal of Combinatorics	Publication Date: Aug 3, 2006
Citations: 14

#Combinatorial Classes #Radius Of Convergence #Standard Constructions #Standard Sequence #Positive Radius #Simple Test

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Combinatorial classes ${\cal T}$ that are recursively defined using combinations of the standard multiset, sequence, directed cycle and cycle constructions, and their restrictions, have generating series ${\bf T}(z)$ with a positive radius of convergence; for most of these a simple test can be used to quickly show that the form of the asymptotics is the same as that for the class of rooted trees: $C \rho^{-n} n^{-3/2}$, where $\rho$ is the radius of convergence of ${\bf T}$.

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Counting Rooted Trees: The Universal Law $t(n)\,\sim\,C \rho^{-n} n^{-3/2}$