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Robust Contraction Decomposition for Minor-Free Graphs and Its Applications

Authors Sayan Bandyapadhyay , William Lochet , Daniel Lokshtanov , Dániel Marx , Pranabendu Misra , Daniel Neuen , Saket Saurabh , Prafullkumar Tale , Jie Xue

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ACM Subject Classification
  • Theory of computation → Graph algorithms analysis
  • Theory of computation → Parameterized complexity and exact algorithms
  • Mathematics of computing → Graph theory
Keywords
  • subexponential time algorithms
  • graph decomposition
  • planar graphs
  • minor-free graphs
  • graph contraction

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Abstract

We prove a robust contraction decomposition theorem for H-minor-free graphs, which states that given an H-minor-free graph G and an integer p, one can partition in polynomial time the vertices of G into p sets Z₁,… ,Z_p such that tw(G/(Z_i ⧵ Z')) = O(p + |Z'|) for all i ∈ [p] and Z' ⊆ Z_i. Here, tw(⋅) denotes the treewidth of a graph and G/(Z_i ⧵ Z') denotes the graph obtained from G by contracting all edges with both endpoints in Z_i ⧵ Z'.
Our result generalizes earlier results by Klein [SICOMP 2008] and Demaine et al. [STOC 2011] based on partitioning E(G), and some recent theorems for planar graphs by Marx et al. [SODA 2022], for bounded-genus graphs (more generally, almost-embeddable graphs) by Bandyapadhyay et al. [SODA 2022], and for unit-disk graphs by Bandyapadhyay et al. [SoCG 2022].
The robust contraction decomposition theorem directly results in parameterized algorithms with running time 2^{Õ(√k)} ⋅ n^{O(1)} or n^{O(√k)} for every vertex/edge deletion problems on H-minor-free graphs that can be formulated as Permutation CSP Deletion or 2-Conn Permutation CSP Deletion. Consequently, we obtain the first subexponential-time parameterized algorithms for Subset Feedback Vertex Set, Subset Odd Cycle Transversal, Subset Group Feedback Vertex Set, 2-Conn Component Order Connectivity on H-minor-free graphs. For other problems which already have subexponential-time parameterized algorithms on H-minor-free graphs (e.g., Odd Cycle Transversal, Vertex Multiway Cut, Vertex Multicut, etc.), our theorem gives much simpler algorithms of the same running time.

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Sayan Bandyapadhyay, William Lochet, Daniel Lokshtanov, Dániel Marx, Pranabendu Misra, Daniel Neuen, Saket Saurabh, Prafullkumar Tale, and Jie Xue. Robust Contraction Decomposition for Minor-Free Graphs and Its Applications. In 52nd International Colloquium on Automata, Languages, and Programming (ICALP 2025). Leibniz International Proceedings in Informatics (LIPIcs), Volume 334, pp. 17:1-17:19, Schloss Dagstuhl – Leibniz-Zentrum für Informatik (2025) https://doi.org/10.4230/LIPIcs.ICALP.2025.17

Author Details

Sayan Bandyapadhyay
  • Portland State University, OR, USA
William Lochet
  • LIRMM, Université de Montpellier, CNRS, France
Daniel Lokshtanov
  • University of California, Santa Barbara, CA, USA
Dániel Marx
  • CISPA Helmholtz Center for Information Security, Saarbrücken, Germany
Pranabendu Misra
  • Chennai Mathematical Institute, India
Daniel Neuen
  • Max Planck Institute for Informatics, SIC, Saarbrücken, Germany
Saket Saurabh
  • The Institute of Mathematical Sciences, Chennai, India
Prafullkumar Tale
  • Indian Institute of Science Education and Research, Pune, India
Jie Xue
  • New York University Shanghai, China

Funding

  • Bandyapadhyay, Sayan: The work has been supported by the NSF grant 2311397.
  • Misra, Pranabendu: Supported by SERB StartUp Grant.

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