Random 2-cell embeddings of multistars
Abstract
Random 2-cell embeddings of a given graph are obtained by choosing a random local rotation around every vertex. We analyze the expected number of faces, , 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 nonleaf edges lies in an interval of length centered at the expected number of faces of an -edge dipole. This allows us to derive bounds on for any given graph in terms of vertex degrees. We conjecture that for any simple -vertex graph .
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