A unified polynomial-time algorithm for Feedback Vertex Set on graphs of bounded mim-width

TL;DR

This paper introduces a polynomial-time algorithm for Feedback Vertex Set on graphs with bounded mim-width, unifying solutions for many graph classes and extending to new classes like Circular Permutation graphs.

Contribution

It provides the first polynomial-time algorithm for Feedback Vertex Set on graphs of bounded mim-width and shows how to compute mim-width decompositions for various graph powers.

Findings

Polynomial-time algorithm for Feedback Vertex Set on graphs of bounded mim-width

Unifies algorithms for classes like Interval and Permutation graphs

Extends to classes like Circular Permutation and Circular k-Trapezoid graphs

Abstract

We give a first polynomial-time algorithm for (Weighted) Feedback Vertex Set on graphs of bounded maximum induced matching width (mim-width). Explicitly, given a branch decomposition of mim-width $w$, we give an $n^{\mathcal{O}(w)}$-time algorithm that solves Feedback Vertex Set. This provides a unified algorithm for many well-known classes, such as Interval graphs and Permutation graphs, and furthermore, it gives the first polynomial-time algorithms for other classes of bounded mim-width, such as Circular Permutation and Circular $k$-Trapezoid graphs for fixed $k$. In all these classes the decomposition is computable in polynomial time, as shown by Belmonte and Vatshelle [Theor. Comput. Sci. 2013]. We show that powers of graphs of tree-width $w - 1$ or path-width $w$ and powers of graphs of clique-width $w$ have mim-width at most $w$. These results extensively provide new classes of bounded mim-width. We prove a slight strengthening of the first statement which implies that, surprisingly, Leaf Power graphs which are of importance in the field of phylogenetic studies have mim-width at most $1$. Given a tree decomposition of width $w-1$, a path decomposition of width $w$, or a clique-width $w$-expression of a graph, one can for any value of $k$ find a mim-width decomposition of its $k$-power in polynomial time, and apply our algorithm to solve Feedback Vertex Set on the $k$-power in time $n^{\mathcal{O}(w)}$. In contrast to Feedback Vertex Set, we show that Hamiltonian Cycle is NP-complete even on graphs of linear mim-width $1$, which further hints at the expressive power of the mim-width parameter.