Bipartite cubic planar graphs are dispersable
Abstract
The book embedding of a graph G is to place the vertices of G on the spine and draw the edges to the pages so that the edges in the same page do not cross with each other. A book embedding is matching if the vertices in the same page have maximum degree at most 1. The matching book thickness is the minimum number of pages in which a graph can be matching book embedded. A graph G is dispersable if and only if mbt(G)=(G). In this paper, we prove that bipartite cubic planar graphs are dispersable.
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