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We prove $G^{[k]}$ is word-representable if and only if $G$ is a comparability graph. We establish bounds $\mu(G^{[k]}) \le \mathrm{cov}_{\mathrm{comp}}(G)$ and $\mu(G^{[k]}) \le k$ for non-comparability word-representable graphs. Using lexicographic powers, we obtain the sublinear bound $\tau(n) \le n^{\log_8 6+\epsilon}$ for the extremal function $\tau(n)$. Finally, we address the Word-representable Bipartition (WB) problem, proving a negative answer for $n \geq 2593$: showing that for every such $n$, there exists a graph of order $n$ that cannot be vertex-partitioned into two word-representable induced subgraphs.
From: Sreyas Sasidharan [view email]
[v1]
Tue, 31 Mar 2026 11:52:38 UTC (359 KB)
[v2]
Fri, 3 Apr 2026 19:59:05 UTC (263 KB)
[v3]
Wed, 3 Jun 2026 17:47:11 UTC (25 KB)
[v4]
Mon, 8 Jun 2026 17:16:14 UTC (27 KB)
[v5]
Mon, 29 Jun 2026 17:56:05 UTC (32 KB)
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