Ladder graph
The ladder graph L8.
Vertices	⁠${\displaystyle 2n}$⁠
Edges	⁠${\displaystyle 3n-2}$⁠
Chromatic number	⁠${\displaystyle 2}$⁠
Chromatic index	${\displaystyle {\begin{cases}3&{\text{if }}n>2\\2&{\text{if }}n=2\\1&{\text{if }}n=1\end{cases}}}$
Properties	Unit distance Hamiltonian Planar Bipartite
Notation	⁠${\displaystyle L_{n}}$⁠
Table of graphs and parameters

In the mathematical field of graph theory, the ladder graph L_n is a planar, undirected graph with 2n vertices and 3n − 2 edges.^[1]

The ladder graph can be obtained as the Cartesian product of two path graphs, one of which has only one edge: L_n = P_n □ P₂.^[2][3]

By construction, the ladder graph L_n is isomorphic to the grid graph G_2,n and looks like a ladder with n rungs. It is Hamiltonian with girth 4 (if n>1) and chromatic index 3 (if n>2).

The chromatic number of the ladder graph is 2 and its chromatic polynomial is ${\displaystyle (x-1)x(x^{2}-3x+3)^{(n-1)}}$.

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  The chromatic number of the ladder graph is 2.

Sometimes the term "ladder graph" is used for the nP₂ ladder rung graph, which is the graph union of n copies of the path graph P₂.

The circular ladder graph CL_n is constructible by connecting the four 2-degree vertices in a straight way, or by the Cartesian product of a cycle of length n ≥ 3 and an edge.^[4] In symbols, CL_n = C_n □ P₂. It has 2n nodes and 3n edges. Like the ladder graph, it is connected, planar and Hamiltonian, but it is bipartite if and only if n is even.

Circular ladder graph are the polyhedral graphs of prisms, so they are more commonly called prism graphs.

Circular ladder graphs:

CL3

CL4

CL5

CL6

CL7

CL8

Connecting the four 2-degree vertices of a standard ladder graph crosswise creates a cubic graph called a Möbius ladder.