English

Random 2-cell embeddings of multistars

Combinatorics 2024-01-12 v2 Discrete Mathematics

Abstract

Random 2-cell embeddings of a given graph GG are obtained by choosing a random local rotation around every vertex. We analyze the expected number of faces, E[FG]\mathbb{E}[F_G], of such an embedding which is equivalent to studying its average genus. So far, tight results are known for two families called monopoles and dipoles. We extend the dipole result to a more general family called multistars, i.e., loopless multigraphs in which there is a vertex incident with all the edges. In particular, we show that the expected number of faces of every multistar with nn nonleaf edges lies in an interval of length 2/(n+1)2/(n + 1) centered at the expected number of faces of an nn-edge dipole. This allows us to derive bounds on E[FG]\mathbb{E}[F_G] for any given graph GG in terms of vertex degrees. We conjecture that E[FG]O(n)\mathbb{E}[F_G ] \le O(n) for any simple nn-vertex graph GG.

Keywords

Cite

@article{arxiv.2103.05036,
  title  = {Random 2-cell embeddings of multistars},
  author = {Jesse Campion Loth and Kevin Halasz and Tomáš Masařík and Bojan Mohar and Robert Šámal},
  journal= {arXiv preprint arXiv:2103.05036},
  year   = {2024}
}

Comments

15 pages, 2 figures. Accepted to European conference on combinatorics, graph theory and applications (EUROCOMB) 2021

R2 v1 2026-06-23T23:53:36.898Z