Generalized Petersen graph graph theory , the generalized Petersen graphs cubic graphs formed by connecting the vertices of a regular polygon to the corresponding vertices of a star polygon . They include the Petersen graph and generalize one of the ways of constructing the Petersen graph. The generalized Petersen graph family was introduced in 1950 by H. S. M. Coxeter and was given its name in 1969 by Mark Watkins.In Watkins' notation, G is a graph with vertex setmodulo n and k < n /2. Some authors use the notation GPG . Coxeter's notation for the same graph would be +, a combination of the Schläfli symbols for the regular n -gon and star polygon from which the graph is formed. The Petersen graph itself is G or +.voltage graph with two vertices, two self-loops, and one other edge.Examples Among the generalized Petersen graphs are the n -prism G , the Dürer graph G , the Möbius-Kantor graph G , the dodecahedron G , the Desargues graph G and the Nauru graph G .G – are among the seven graphs that are cubic , 3-vertex-connected , and well-covered .Properties This family of graphs possesses a number of interesting properties. For example: G is vertex-transitive if and only if = or k 2 ≡ ±1. G is edge-transitive only in the following seven cases: =,,,,,,. These seven graphs are therefore the only symmetric generalized Petersen graphs. G is bipartite if and only if n is even and k is odd. G is a Cayley graph if and only if k 2 ≡ 1. G is hypohamiltonian when n is congruent to 5 modulo 6 and k = 2, n − 2, or /2. It is also non-Hamiltonian when n is divisible by 4 , at least equal to 8, and k = n /2. In all other cases it has a Hamiltonian cycle . When n is congruent to 3 modulo 6 G has exactly three Hamiltonian cycles. For G , the number of Hamiltonian cycles can be computed by a formula that depends on the congruence class of n modulo 6 and involves the Fibonacci numbers . Every generalized Petersen graph is a unit distance graph .Isomorphisms G is isomorphic to G if and only if kl ≡ 1.Girth The girth of G is at least 3 and at most 8, in particular:Brooks' theorem their chromatic number can not be larger than their degree . Generalized Petersen graphs are cubic, so their chromatic number can be either 2 or 3. More exactly:logical AND , while the logical OR . For example, the chromatic number of is 3.snark , has a chromatic index of 4. All other generalized Petersen graph has chromatic index 3.G is one of the few graphs known to have only one 3-edge-coloring .
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