English

On Dispersable Book Embeddings

Discrete Mathematics 2018-03-28 v1 Combinatorics

Abstract

In a dispersable book embedding, the vertices of a given graph GG must be ordered along a line l, called spine, and the edges of G must be drawn at different half-planes bounded by l, called pages of the book, such that: (i) no two edges of the same page cross, and (ii) the graphs induced by the edges of each page are 1-regular. The minimum number of pages needed by any dispersable book embedding of GG is referred to as the dispersable book thickness dbt(G)dbt(G) of GG. Graph GG is called dispersable if dbt(G)=Δ(G)dbt(G) = \Delta(G) holds (note that Δ(G)dbt(G)\Delta(G) \leq dbt(G) always holds). Back in 1979, Bernhart and Kainen conjectured that any kk-regular bipartite graph GG is dispersable, i.e., dbt(G)=kdbt(G)=k. In this paper, we disprove this conjecture for the cases k=3k=3 (with a computer-aided proof), and k=4k=4 (with a purely combinatorial proof). In particular, we show that the Gray graph, which is 3-regular and bipartite, has dispersable book thickness four, while the Folkman graph, which is 4-regular and bipartite, has dispersable book thickness five. On the positive side, we prove that 3-connected 3-regular bipartite planar graphs are dispersable, and conjecture that this property holds, even if 3-connectivity is relaxed.

Keywords

Cite

@article{arxiv.1803.10030,
  title  = {On Dispersable Book Embeddings},
  author = {Jawaherul Md. Alam and Michael A. Bekos and Martin Gronemann and Michael Kaufmann and Sergey Pupyrev},
  journal= {arXiv preprint arXiv:1803.10030},
  year   = {2018}
}
R2 v1 2026-06-23T01:06:16.706Z