Necessary Spectral Conditions for Coloring Hypergraphs

Franklin H. J. Kenter

arXiv:1412.3855·math.CO·December 15, 2014·2 cites

Necessary Spectral Conditions for Coloring Hypergraphs

Franklin H. J. Kenter

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Abstract

Hoffman proved that for a simple graph $G$ , the chromatic number $χ (G)$ obeys $χ (G) \leq 1 - \frac{λ _{1}}{λ _{n}}$ where $λ_{1}$ and $λ_{n}$ are the maximal and minimal eigenvalues of the adjacency matrix of $G$ respectively. Lov\'asz later showed that $χ (G) \leq 1 - \frac{λ _{1}}{λ _{n}}$ for any (perhaps negatively) weighted adjacency matrix. In this paper, we give a probabilistic proof of Lov\'asz's theorem, then extend the technique to derive generalizations of Hoffman's theorem when allowed a certain proportion of edge-conflicts. Using this result, we show that if a 3-uniform hypergraph is 2-colorable, then $\overset{ˉ}{d} \leq - \frac{3}{2} λ_{m i n}$ where $\overset{ˉ}{d}$ is the average degree and $λ_{m i n}$ is the minimal eigenvalue of the underlying graph. We generalize this further for $k$ -uniform hypergraphs, for the cases $k = 4$ and $5$ , by…

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TopicsTensor decomposition and applications · Graph theory and applications · Limits and Structures in Graph Theory