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Parity theorems for paths and cycles in graphs |
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| Authors: | J. A. Bondy F. Y. Halberstam |
| Abstract: | We extend an elegant proof technique of A. G. Thomason, and deduce several parity theorems for paths and cycles in graphs. For example, a graph in which each vertex is of even degree has an even number of paths if and only if it is of even order, and a graph in which each vertex is of odd degree has an even number of paths if and only if its order is a multiple of four. Our results have implications for generalized friendship graphs and their conjectured nonexistence. |
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