Book (graph theory)

One kind, which may be called a quadrilateral book, consists of p quadrilaterals sharing a common edge (known as the "spine" or "base" of the book). That is, it is a Cartesian product of a star and a single edge.[1][2] The 7-page book graph of this type provides an example of a graph with no harmonious labeling.[2]

A second type, which might be called a triangular book, is the complete tripartite graph K_1,1,p. It is a graph consisting of ${\displaystyle p}$ triangles sharing a common edge.[3] A book of this type is a split graph. This graph has also been called a ${\displaystyle K_{e}(2,p)}$.[4] Triangular books form one of the key building blocks of line perfect graphs.[5]

The term "book-graph" has been employed for other uses. Barioli[6] used it to mean a graph composed of a number of arbitrary subgraphs having two vertices in common. (Barioli did not write ${\displaystyle B_{p}}$ for his book-graph.)

Given a graph ${\displaystyle G}$, one may write ${\displaystyle bk(G)}$ for the largest book (of the kind being considered) contained within ${\displaystyle G}$.

Denote the Ramsey number of two triangular books by ${\displaystyle r(B_{p},\ B_{q}).}$ This is the smallest number ${\displaystyle r}$ such that for every ${\displaystyle r}$-vertex graph, either the graph itself contains ${\displaystyle B_{p}}$ as a subgraph, or its complement graph contains ${\displaystyle B_{q}}$ as a subgraph.

• If ${\displaystyle 1\leq p\leq q}$, then ${\displaystyle r(B_{p},\ B_{q})=2q+3}$.[7]
• There exists a constant ${\displaystyle c=o(1)}$ such that ${\displaystyle r(B_{p},\ B_{q})=2q+3}$ whenever ${\displaystyle q\geq cp}$.
• If ${\displaystyle p\leq q/6+o(q)}$, and ${\displaystyle q}$ is large, the Ramsey number is given by ${\displaystyle 2q+3}$.
• Let ${\displaystyle C}$ be a constant, and ${\displaystyle k=Cn}$. Then every graph on ${\displaystyle n}$ vertices and ${\displaystyle m}$ edges contains a (triangular) ${\displaystyle B_{k}}$.[8]