Bounding the mim‐width of hereditary graph classes

Brettell, Nick; Horsfield, Jake; Munaro, Andrea; Paesani, Giacomo; Paulusma, Daniël

doi:10.1002/jgt.22730

Cited by 16 publications

(25 citation statements)

References 46 publications

(78 reference statements)

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“…For Open Problem 2 we note that Vertex Steiner Tree is polynomial-time solvable for P 4 -free graphs by Theorem 2. It is known that (K 1,3 , P 5 )-free graphs have unbounded mim-width [7]. Hence, the first open case is where t = 5.…”

Section: Discussionmentioning

confidence: 99%

“…For the less restrictive width parameter clique-width (or equivalently boolean-width, rank-width, module-width, or NLC-width [8,18,22,24]) or the even less restrictive width parameter mim-width, such dichotomies have not yet been established for (H 1 , H 2 )-free graphs. We refer to [12] and [7] for state-ofthe-art summaries for clique-width and mim-width, respectively.…”

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confidence: 99%

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Steiner trees for hereditary graph classes: A treewidth perspective

Bodlaender

Brettell

Johnson

et al. 2021

Theoretical Computer Science

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Section: Discussionmentioning

confidence: 99%

mentioning

confidence: 99%

Steiner trees for hereditary graph classes: A treewidth perspective

Bodlaender

Brettell

Johnson

et al. 2021

Theoretical Computer Science

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“…Papadopoulos and Tzimas [32,33] proved that Subset Feedback Vertex Set is polynomial-time solvable for sP 1 -free graphs for any s ≥ 1, cobipartite graphs, interval graphs and permutation graphs, and thus P 4 -free graphs. Some of these results were generalized by Bergougnoux et al [2], who solved an open problem of Jaffke et al [23] by giving an n O(w 2 ) -time algorithm for Subset Feedback Vertex Set given a graph and a decomposition of this graph of mim-width w. This does not lead to new results for H-free graphs: a class of H-free graphs has bounded mim-width if and only if H ⊆ i P 4 [7].…”

Section: Subset Vertex Covermentioning

confidence: 99%

Computing Subset Transversals in $H$-Free Graphs

Brettell¹,

Johnson²,

Paesani³

et al. 2020

Preprint

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We study the computational complexity of two well-known graph transversal problems, namely Subset Feedback Vertex Set and Subset Odd Cycle Transversal, by restricting the input to H-free graphs, that is, to graphs that do not contain some fixed graph H as an induced subgraph. By combining known and new results, we determine the computational complexity of both problems on H-free graphs for every graph H except when H = sP1 + P4 for some s ≥ 1. As part of our approach, we introduce the Subset Vertex Cover problem and prove that it is polynomial-time solvable for (sP1 + P4)-free graphs for every s ≥ 1.

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“…Such a classification already exists for H-free graphs, as observed in [22]: for a graph H, the class of H-free graphs has bounded linear rank-width if and only if H is a subgraph of P 3 not isomorphic to 3P 1 . We note that similar classifications also exist for other width parameters: for the tree-width of pH 1 , H 2 q-free graphs [7], the rank-width of H-free graphs (see [22]), rank-width of H-free bipartite graphs [23,35,36], and up to five non-equivalent open cases, rank-width of pH 1 , H 2 q-free graphs (see [8] or [22]), mim-width of H-free graphs, whereas there is still an infinite number of open cases left for the mim-width of pH 1 , H 2 q-free graphs [13].…”

Section: The Proof Of Theorem 110mentioning

confidence: 99%

Tree pivot-minors and linear rank-width

Dabrowski,

Dross,

Jeong

et al. 2020

Preprint

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Tree-width and its linear variant path-width play a central role for the graph minor relation. In particular, Robertson and Seymour (1983) proved that for every tree T , the class of graphs that do not contain T as a minor has bounded path-width. For the pivot-minor relation, rank-width and linear rank-width take over the role from tree-width and path-width. As such, it is natural to examine if for every tree T , the class of graphs that do not contain T as a pivot-minor has bounded linear rank-width. We first prove that this statement is false whenever T is a tree that is not a caterpillar. We conjecture that the statement is true if T is a caterpillar. We are also able to give partial confirmation of this conjecture by proving:• for every tree T , the class of T -pivot-minor-free distance-hereditary graphs has bounded linear rank-width if and only if T is a caterpillar;

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Bounding the mim‐width of hereditary graph classes

Cited by 16 publications

References 46 publications

Steiner trees for hereditary graph classes: A treewidth perspective

Steiner trees for hereditary graph classes: A treewidth perspective

Computing Subset Transversals in $H$-Free Graphs

Tree pivot-minors and linear rank-width

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