Flower snark

In the mathematical field of graph theory, the flower snarks form an infinite family of snarks introduced by Rufus Isaacs in 1975.^[1]

As snarks, the flower snarks are connected, bridgeless cubic graphs with chromatic index equal to 4. The flower snarks are non-planar and non-hamiltonian.

Construction

The flower snark J_n can be constructed with the following process :

• Build n copies of the star graph on 4 vertices. Denote the central vertex of each star A_i and the outer vertices B_i, C_i and D_i. This results in a disconnected graph on 4n vertices with 3n edges (A_i-B_i, A_i-C_i and A_i-D_i for 1≤i≤n).
• Construct the n-cycle (B₁... B_n). This adds n edges.
• Finally construct the 2n-cycle (C₁... C_nD₁... D_n). This adds 2n edges.

By construction, the Flower snark J_n is a cubic graph with 4n vertices and 6n edges. For it to have the required properties, n should be odd.

Special cases

The name flower snark is sometimes used for J₅, a flower snark with 20 vertices and 30 edges.^[2] It is one of 6 snarks on 20 vertices (sequence A130315 in the OEIS). The flower snark J₅ is hypohamiltonian.^[3]

J₃ is a trivial variation of the Petersen graph formed by replacing one of its vertices by a triangle. This graph is also known as the Tietze's graph.^[4] In order to avoid trivial cases, snarks are generally restricted to have girth at least 5. With that restriction, J₃ is not a snark.

Gallery

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  The chromatic number of the flower snark J₅ is 3.

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  The chromatic index of the flower snark J₅ is 4.

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  The original representation of the flower snark J₅.

References