In the mathematical field of graph theory, a Descartes snark is an undirected graph with 210 vertices and 315 edges. It is a snark, first discovered by William Tutte in 1948 under the pseudonym Blanche Descartes.[1]
| Descartes snark | |
|---|---|
 Image of a Descartes snark. | |
| Named after | Blanche Descartes |
| Vertices | 210 |
| Edges | 315 |
| Girth | 5 |
| Chromatic index | 4 |
| Properties | Cubic Snark |
| Table of graphs and parameters | |
A Descartes snark is obtained from the Petersen graph by replacing each vertex with a nonagon and each edge with a particular graph closely related to the Petersen graph. Because there are multiple ways to perform this procedure, there are multiple Descartes snarks.
References edit
- ^ Descartes, Blanche. "Network Colorings," The Mathematical Gazette (London, 32:299. p. 67–69, 1948.
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