English

On random trees obtained from permutation graphs

Combinatorics 2016-01-22 v2

Abstract

A permutation w\boldsymbol w gives rise to a graph GwG_{\boldsymbol w}; the vertices of GwG_{\boldsymbol w} are the letters in the permutation and the edges of GwG_{\boldsymbol w} are the inversions of w\boldsymbol w. We find that the number of trees among permutation graphs with nn vertices is 2n22^{n-2} for n2n\ge 2. We then study TnT_n, a uniformly random tree from this set of trees. In particular, we study the number of vertices of a given degree in TnT_n, the maximum degree in TnT_n, the diameter of TnT_n, and the domination number of TnT_n. Denoting the number of degree-kk vertices in TnT_n by DkD_k, we find that (D1,,Dm)(D_1,\dots,D_m) converges to a normal distribution for any fixed mm as nn\to \infty. The vertex domination number of TnT_n is also asymptotically normally distributed as nn\to \infty. The diameter of TnT_n shifted by 2-2 is binomially distributed with parameters n3n-3 and 1/21/2. Finally, we find the asymptotic distribution of the maximum degree in TnT_n, which is concentrated around log2n\log_2n.

Keywords

Cite

@article{arxiv.1406.3958,
  title  = {On random trees obtained from permutation graphs},
  author = {Huseyin Acan and Pawel Hitczenko},
  journal= {arXiv preprint arXiv:1406.3958},
  year   = {2016}
}

Comments

17 pages

R2 v1 2026-06-22T04:39:09.964Z