
doi: 10.37236/733
It is shown that a matching covered graph has an ear decomposition with no more than one double ear if and only if there is no set $S$ of edges such that $|S \cap A|$ is even for every alternating circuit $A$ but $|S \cap C|$ is odd for some even circuit $C$. Two proofs are presented. The first uses vector spaces and the second is constructive. Some applications are also given.
Edge subsets with special properties (factorization, matching, partitioning, covering and packing, etc.), matching covered graph, ear decomposition
Edge subsets with special properties (factorization, matching, partitioning, covering and packing, etc.), matching covered graph, ear decomposition
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