Coloring Graphs With No Totally Odd Clique Immersion
classification
🧮 math.CO
cs.DM
keywords
immersiongraphtotallygraphsmathcalalgorithmalgorithmicbipartite
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We prove that graphs that do not contain a totally odd immersion of $K_t$ are $\mathcal{O}(t)$-colorable. In particular, we show that any graph with no totally odd immersion of $K_t$ is the union of a bipartite graph and a graph which forbids an immersion of $K_{\mathcal{O}(t)}$. Our results are algorithmic, and we give a fixed-parameter tractable algorithm (in $t$) to find such a decomposition.
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Cited by 1 Pith paper
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Coloring graphs with independence number two and no odd clique immersions
Graphs with independence number ≤2 and no strong odd Kt-immersion satisfy χ(G) ≤ ⌈3(t-1)/2⌉.
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