On Dispersable Book Embeddings
Abstract
In a dispersable book embedding, the vertices of a given graph 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 is referred to as the dispersable book thickness of . Graph is called dispersable if holds (note that always holds). Back in 1979, Bernhart and Kainen conjectured that any -regular bipartite graph is dispersable, i.e., . In this paper, we disprove this conjecture for the cases (with a computer-aided proof), and (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}
}