Tree independence number V. Walls and claws

TL;DR

This paper proves that graphs excluding certain line graphs of subdivided hexagonal grids and specific subdivided stars and complete bipartite graphs have bounded tree independence number, enabling quasi-polynomial algorithms for NP-hard problems.

Contribution

It establishes a new bound on the tree independence number for a class of graphs defined by forbidden induced subgraphs, extending previous conjectures.

Findings

Graphs in the class admit tree decompositions with small independent sets in each bag.

NP-hard problems like Maximum Weight Independent Set can be solved in quasi-polynomial time on these graphs.

Existence of balanced separators contained in neighborhoods of bounded size for these graphs.

Abstract

Given a family $\mathcal{H}$ of graphs, we say that a graph $G$ is $\mathcal{H}$-free if no induced subgraph of $G$ is isomorphic to a member of $\mathcal{H}$. Let $S_{t,t,t}$ be the graph obtained from $K_{1,3}$ by subdividing each edge $t-1$ times, and let $W_{t\times t}$ be the $t$-by-$t$ hexagonal grid. Let $\mathcal{L}_t$ be the family of all graphs $G$ such that $G$ is the line graph of some subdivision of $W_{t \times t}$. We prove that for every positive integer $t$ there exists $c(t)$ such that every $\mathcal{L}_t \cup \{S_{t,t,t}, K_{t,t}\}$-free $n$-vertex graph admits a tree decomposition in which the maximum size of an independent set in each bag is at most $c(t)\log^4n$. This is a variant of a conjecture of Dallard, Krnc, Kwon, Milani\v{c}, Munaro, \v{S}torgel, and Wiederrecht from 2024. This implies that the Maximum Weight Independent Set problem, as well as many other natural algorithmic problems, that are known to be NP-hard in general, can be solved in quasi-polynomial time if the input graph is $\mathcal{L}_t \cup \{S_{t,t,t},K_{t,t}\}$-free. As part of our proof, we show that for every positive integer $t$ there exists an integer $d$ such that every $\mathcal{L}_t \cup \{S_{t,t,t}\}$-free graph admits a balanced separator that is contained in the neighborhood of at most $d$ vertices.