Path graph

This article is about a family of graphs. For paths as parts of arbitrary graphs, see Path (graph theory).

Not to be confused with line graph.

Path graph
A path graph on 6 vertices
Vertices	n
Edges	n − 1
Radius	⌊n / 2⌋
Diameter	n − 1
Automorphisms	2
Chromatic number	2
Chromatic index	2
Spectrum	{2 cos(k π / (n + 1)); k = 1, ..., n}
Properties	Unit distance Bipartite graph Tree
Notation	${\displaystyle P_{n}}$
Table of graphs and parameters

In the mathematical field of graph theory, a path graph or linear graph is a graph whose vertices can be listed in the order v₁, v₂, …, v_n such that the edges are {v_i, v_i+1} where i = 1, 2, …, n − 1. Equivalently, a path with at least two vertices is connected and has two terminal vertices (vertices that have degree 1), while all others (if any) have degree 2.

Paths are often important in their role as subgraphs of other graphs, in which case they are called paths in that graph. A path is a particularly simple example of a tree, and in fact the paths are exactly the trees in which no vertex has degree 3 or more. A disjoint union of paths is called a linear forest.

Paths are fundamental concepts of graph theory, described in the introductory sections of most graph theory texts. See, for example, Bondy and Murty (1976), Gibbons (1985), or Diestel (2005).

As Dynkin diagrams

In algebra, path graphs appear as the Dynkin diagrams of type A. As such, they classify the root system of type A and the Weyl group of type A, which is the symmetric group.

See also

• Path (graph theory)
• Caterpillar tree
• Complete graph
• Null graph
• Path decomposition
• Cycle (graph theory)

References

• Bondy, J. A.; Murty, U. S. R. (1976). Graph Theory with Applications. North Holland. pp. 12–21. ISBN 0-444-19451-7.
• Diestel, Reinhard (2005). Graph Theory (3rd ed.). Graduate Texts in Mathematics, vol. 173, Springer-Verlag. pp. 6–9. ISBN 3-540-26182-6.

External links

• Weisstein, Eric W. "Path Graph". MathWorld.