(Treewidth, Clique)-Boundedness and Poly-logarithmic Tree-Independence
Abstract
An independent set in a graph is a set of pairwise non-adjacent vertices. A tree decomposition of is a pair where is a tree and is a function satisfying the following two axioms: for every edge there is a such that , and for every vertex the set induces a non-empty and connected subtree of . The sets for are called the bags of the tree decomposition. The tree-independence number of is the minimum taken over all tree decompositions of of the maximum size of an independent set of the graph induced by a bag of the tree decomposition. The study of graph classes with bounded tree-independence number has attracted much attention in recent years, in part due its improtant algorithmic implications. A conjecture of Dallard, Milani\v{c} and \v{S}torgel, connecting tree-independence number to the classical notion of treewidth, was one of the motivating problems in the area. This conjecture was recently disproved, but here we prove a slight variant of it, that retains much of the algorithmic significance. As part of the proof we introduce the notion of independence-containers, which can be viewed as a generalization of the set of all maximal cliques of a graph, and is of independent interest.
Keywords
Cite
@article{arxiv.2510.15074,
title = {(Treewidth, Clique)-Boundedness and Poly-logarithmic Tree-Independence},
author = {Maria Chudnovsky and Ajaykrishnan E S and Daniel Lokshtanov},
journal= {arXiv preprint arXiv:2510.15074},
year = {2026}
}