Decomposing complete equipartite graphs into short odd cycles (Q1960284)
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scientific article; zbMATH DE number 5799458
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Decomposing complete equipartite graphs into short odd cycles |
scientific article; zbMATH DE number 5799458 |
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Decomposing complete equipartite graphs into short odd cycles (English)
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13 October 2010
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Summary: We examine the problem of decomposing the lexicographic product of a cycle with an empty graph into cycles of uniform length. We determine necessary and sufficient conditions for a solution to this problem when the cycles are of odd length. We apply this result to find necessary and sufficient conditions to decompose a complete equipartite graph into cycles of uniform length, in the case that the length is both odd and short relative to the number of parts.
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lexicographic product of a cycle
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0.98526716
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0.9519073
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0.9451148
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0.93841636
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0.93493986
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0.9342565
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0.92699337
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