The \emph{matching book embedding} of a graph $G$ is to arrange its vertices
on the spine, and draw its edges into the pages so that the edges on every page
do not intersect each other and the maximum degree of vertices on every page is
one. The \emph{matching book thickness} is the minimum number of pages in which
the graph $G$ can be matching embedded. In this paper, the matching book
thickness of Halin graphs is determined

Geng, Huiru

Li, Zhiguo

Shao, Zeling

English

arXiv

The \emph{matching book embedding} of a graph $G$ is to arrange its vertices
on the spine, and draw its edges into the pages so that the edges on every page
do not intersect each other and the maximum degree of vertices on every page is
one. The \emph{matching book thickness} is the minimum number of pages in which
the graph $G$ can be matching embedded. In this paper, the matching book
thickness of Halin graphs is determined.Comment: The proof in the manuscripts can be simplifie

Matching Book Thickness of Halin Graphs

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