English

Hitting minors on bounded treewidth graphs. II. Single-exponential algorithms

Data Structures and Algorithms 2021-03-12 v1 Computational Complexity Discrete Mathematics Combinatorics

Abstract

For a finite collection of graphs F{\cal F}, the F{\cal F}-M-DELETION (resp. F{\cal F}-TM-DELETION) problem consists in, given a graph GG and an integer kk, decide whether there exists SV(G)S \subseteq V(G) with Sk|S| \leq k such that GSG \setminus S does not contain any of the graphs in F{\cal F} as a minor (resp. topological minor). We are interested in the parameterized complexity of both problems when the parameter is the treewidth of GG, denoted by twtw, and specifically in the cases where F{\cal F} contains a single connected planar graph HH. We present algorithms running in time 2O(tw)nO(1)2^{O(tw)} \cdot n^{O(1)}, called single-exponential, when HH is either P3P_3, P4P_4, C4C_4, the paw, the chair, and the banner for both {H}\{H\}-M-DELETION and {H}\{H\}-TM-DELETION, and when H=K1,iH=K_{1,i}, with i1i \geq 1, for {H}\{H\}-TM-DELETION. Some of these algorithms use the rank-based approach introduced by Bodlaender et al. [Inform Comput, 2015]. This is the second of a series of articles on this topic, and the results given here together with other ones allow us, in particular, to provide a tight dichotomy on the complexity of {H}\{H\}-M-DELETION in terms of HH.

Keywords

Cite

@article{arxiv.2103.06536,
  title  = {Hitting minors on bounded treewidth graphs. II. Single-exponential algorithms},
  author = {Julien Baste and Ignasi Sau and Dimitrios M. Thilikos},
  journal= {arXiv preprint arXiv:2103.06536},
  year   = {2021}
}

Comments

36 pages, 2 figures

R2 v1 2026-06-23T23:59:21.140Z