Szekeres snark

E386032

The Szekeres snark is a famous cubic graph in graph theory that serves as a counterexample in edge-coloring problems and helped advance the study of snark graphs.

All labels observed (1)

Label Occurrences
Szekeres snark canonical 1

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Statements (29)

Predicate Object
instanceOf bridgeless cubic graph
cubic graph
non-3-edge-colorable graph
snark graph
chromaticIndex 4
chromaticNumber 3
contributedTo development of snark theory
edgeChromaticIndex 4
field graph theory
girth 5
hasEdgeConnectivity 3
hasProperty bridgeless
connected graph
cubic
cyclically 4-edge-connected
non-Hamiltonian
non-planar
regular of degree 3
simple graph
snark
triangle-free
isComparedWith Blanuša snarks
Flower snark
Petersen graph
isCounterexampleTo 3-edge-colorability of bridgeless cubic graphs
isUsedAs counterexample in edge-coloring problems
example in the study of snark graphs
namedAfter George Szekeres
vertexDegree 3

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Referenced by (1)

Full triples — surface form annotated when it differs from this entity's canonical label.

George Szekeres notableWork Szekeres snark