The leafage of a chordal graph $G$ is the minimum integer $\ell$ such that $G$ can be realized as an intersection graph of subtrees of a tree with $\ell$ leaves.
We consider structural parameterization by the leafage of classical domination and cut problems on chordal graphs.
Fomin, Golovach, and Raymond~[ESA~$2018$, Algorithmica~$2020$] proved, among other things, that \textsc{Dominating Set} on chordal graphs admits an algorithm running in time $2^{\mathcal{O}(\ell^2)} \cdot n^{\mathcal{O}(1)}$.
We present a conceptually much simpler algorithm that runs in time $2^{\mathcal{O}(\ell)} \cdot n^{\mathcal{O}(1)}$.
We extend our approach to obtain similar results for \textsc{Connected Dominating Set} and \textsc{Steiner Tree}.
We then consider the two classical cut problems \textsc{MultiCut with Undeletable Terminals} and \textsc{Multiway Cut with Undeletable Terminals}.
We prove that the former is \textsf{W}[1]-hard when parameterized by the leafage and complement this result by presenting a simple $n^{\mathcal{O}(\ell)}$-time algorithm.
To our surprise, we find that \textsc{Multiway Cut with Undeletable Terminals} on chordal graphs can be solved, in contrast, in $n^{\mathcal{O}(1)}$-time.
History
Preferred Citation
Esther Galby, Dániel Marx, Philipp Schepper, Roohani Sharma and Prafullkumar Tale. Domination and Cut Problems on Chordal Graphs with Bounded Leafage. In: International Symposium on Parameterized and Exact Computation (IPEC). 2022.
Primary Research Area
Algorithmic Foundations and Cryptography
Name of Conference
International Symposium on Parameterized and Exact Computation (IPEC)
Legacy Posted Date
2022-10-13
Open Access Type
Gold
BibTeX
@inproceedings{cispa_all_3837,
title = "Domination and Cut Problems on Chordal Graphs with Bounded Leafage",
author = "Galby, Esther and Marx, Dániel and Schepper, Philipp and Sharma, Roohani and Tale, Prafullkumar",
booktitle="{International Symposium on Parameterized and Exact Computation (IPEC)}",
year="2022",
}