论文信息 - The Number of Rooted Trees of Given Depth

The Number of Rooted Trees of Given Depth

In this paper it is shown that the logarithm of the number of non-isomorphic rooted trees of depth $k\geq 3$ is asymptotically $\frac{\pi^2}{6}\cdot\frac{n}{\log\log\dots\log n}$, where $\log$ is iterated $k-2$ times in the denominator.

András Pongrácz | Péter Pál Pach | Csaba A. Szabó | Gabriella Pluhár

[1] R. Otter. The Number of Trees , 1948 .

[2] P. Flajolet,et al. The height of random binary unlabelled trees , 2008, 0807.2365.

[3] Michael Drmota,et al. The shape of unlabeled rooted random trees , 2010, Eur. J. Comb..

[4] Hans Rademacher,et al. On the Expansion of the Partition Function in a Series , 1943 .

[5] M. Drmota. Random Trees: An Interplay between Combinatorics and Probability , 2009 .

[6] Philippe Flajolet,et al. Analytic Combinatorics , 2009 .