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arxiv: 2201.07595 · v1 · pith:3QPTIXSSnew · submitted 2022-01-19 · 🧮 math.CO · cs.DM

Strengthening a theorem of Meyniel

classification 🧮 math.CO cs.DM
keywords graphmathcalalphabetadiametereverymeynielplanar
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For an integer $k \geq 1$ and a graph $G$, let $\mathcal{K}_k(G)$ be the graph that has vertex set all proper $k$-colorings of $G$, and an edge between two vertices $\alpha$ and~$\beta$ whenever the coloring~$\beta$ can be obtained from $\alpha$ by a single Kempe change. A theorem of Meyniel from 1978 states that $\mathcal{K}_5(G)$ is connected with diameter $O(5^{|V(G)|})$ for every planar graph $G$. We significantly strengthen this result, by showing that there is a positive constant $c$ such that $\mathcal{K}_5(G)$ has diameter $O(|V(G)|^c)$ for every planar graph $G$.

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