On tree decompositions whose trees are subgraphs
Abstract
Fix k ∈ N and let G be a connected graph with treewidth at most k. We say that xy E(G) is a k-ghost-edge of G if for every tree decomposition (T, ) of G with width at most k, both x and y are contained in a bag of (T, ). Moreover, if G does not contain any k-ghost-edges, then G is k-ghost-free. Hickingbotham proposed a conjecture that every connected k-ghost-free graph G has a tree decomposition (T, ) with width at most k such that T is a subgraph of G. In this paper, we prove that Hickingbotham's conjecture is false for all k≥3.
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