Litcius/Paper detail

Four pages are indeed necessary for planar graphs

Michael Kaufmann, Michael A. Bekos, Fabian Klute, Sergey Pupyrev, Chrysanthi N. Raftopoulou, Torsten Ueckerdt

2020Journal of Computational Geometry (Carleton University)23 citationsDOIOpen Access PDF

Abstract

An embedding of a graph in a book consists of a linear order of its vertices along the spine of the book and of an assignment of its edges to the pages of the book, so that no two edges on the same page cross. The book thickness of a graph is the minimum number of pages over all its book embeddings. Accordingly, the book thickness of a class of graphs is the maximum book thickness over all its members. In this paper, we address a long-standing open problem regarding the exact book thickness of the class of planar graphs, which previously was known to be either three or four. We settle this problem by constructing planar graphs that require four pages in all of their book embeddings, thus establishing that the book thickness of the class of planar graphs is four.

Topics & Concepts

Book embeddingPlanar graphCombinatoricsPlanarEmbeddingClass (philosophy)MathematicsGraph1-planar graphChordal graphDiscrete mathematicsComputer scienceComputer graphics (images)Artificial intelligenceStructural Analysis and OptimizationComputational Geometry and Mesh GenerationAdvanced Graph Theory Research