English

Solving Problems on Generalized Convex Graphs via Mim-Width

Data Structures and Algorithms 2024-02-06 v4 Computational Complexity Discrete Mathematics Combinatorics

Abstract

A bipartite graph G=(A,B,E)G=(A,B,E) is H{\cal H}-convex, for some family of graphs H{\cal H}, if there exists a graph HHH\in {\cal H} with V(H)=AV(H)=A such that the set of neighbours in AA of each bBb\in B induces a connected subgraph of HH. Many NP\mathsf{NP}-complete problems, including problems such as Dominating Set, Feedback Vertex Set, Induced Matching and List kk-Colouring, become polynomial-time solvable for H{\mathcal H}-convex graphs when H{\mathcal H} is the set of paths. In this case, the class of H{\mathcal H}-convex graphs is known as the class of convex graphs. The underlying reason is that the class of convex graphs has bounded mim-width. We extend the latter result to families of H{\mathcal H}-convex graphs where (i) H{\mathcal H} is the set of cycles, or (ii) H{\mathcal H} is the set of trees with bounded maximum degree and a bounded number of vertices of degree at least 33. As a consequence, we can re-prove and strengthen a large number of results on generalized convex graphs known in the literature. To complement result (ii), we show that the mim-width of H{\mathcal H}-convex graphs is unbounded if H{\mathcal H} is the set of trees with arbitrarily large maximum degree or an arbitrarily large number of vertices of degree at least 33. In this way we are able to determine complexity dichotomies for the aforementioned graph problems. Afterwards we perform a more refined width-parameter analysis, which shows even more clearly which width parameters are bounded for classes of H{\cal H}-convex graphs.

Keywords

Cite

@article{arxiv.2008.09004,
  title  = {Solving Problems on Generalized Convex Graphs via Mim-Width},
  author = {Flavia Bonomo-Braberman and Nick Brettell and Andrea Munaro and Daniël Paulusma},
  journal= {arXiv preprint arXiv:2008.09004},
  year   = {2024}
}
R2 v1 2026-06-23T17:59:34.808Z