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JGT
2007

Compatible circuit decompositions of 4-regular graphs

13 years 11 months ago
Compatible circuit decompositions of 4-regular graphs
A transition system T of an Eulerian graph G is a family of partitions of the edges incident to each vertex of G into transitions i.e. subsets of size two. A circuit decomposition C of G is compatible with T if no pair of adjacent edges of G is both a transition of T and consecutive in a circuit of C. We give a conjectured characterization of when a 4-regular graph has a transition system which admits no compatible circuit decomposition. We show that our conjecture is equivalent to the statement that the complete graph on five vertices and the graph with one vertex and two loops are the only essentially 6-edge-connected 4-regular graphs which have a transition system which admits no compatible circuit decomposition. In addition, we show that our conjecture would imply the Circuit Double Cover Conjecture.
Herbert Fleischner, François Genest, Bill J
Added 15 Dec 2010
Updated 15 Dec 2010
Type Journal
Year 2007
Where JGT
Authors Herbert Fleischner, François Genest, Bill Jackson
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