Induced Minor Models. I. Structural Properties and Algorithmic Consequences
Abstract
A graph is said to be an induced minor of a graph if can be obtained from by a sequence of vertex deletions and edge contractions. Equivalently, is an induced minor of if there exists an induced minor model of in , that is, a collection of pairwise disjoint subsets of vertices of labeled by the vertices of , each inducing a connected subgraph in , such that two vertices of are adjacent if and only if there is an edge in between the corresponding subsets. In this paper, we investigate structural properties of induced minor models, including bounds on treewidth and chromatic number of the subgraphs induced by minimal induced minor models. It is known that for some graphs , testing whether a given graph contains as an induced minor is an NP-complete problem. Nevertheless, as algorithmic applications of our structural results, we make use of recent developments regarding tree-independence number to show that if is the -wheel, the -vertex complete graph minus an edge, or a complete bipartite graph , then there is a polynomial-time algorithm to find in a given graph an induced minor model of in , if there is one. We also develop an alternative polynomial-time algorithm for recognizing graphs that do not contain as an induced minor, which revolves around the idea of detecting the induced subgraphs whose presence is forced when the input graph contains as an induced minor, using the so-called shortest path detector. It turns out that all these induced subgraphs are Truemper configurations.
Keywords
Cite
@article{arxiv.2402.08332,
title = {Induced Minor Models. I. Structural Properties and Algorithmic Consequences},
author = {Nicolas Bousquet and Clément Dallard and Maël Dumas and Claire Hilaire and Martin Milanič and Anthony Perez and Nicolas Trotignon},
journal= {arXiv preprint arXiv:2402.08332},
year = {2025}
}
Comments
Section 6 contains the main results of the first version of this preprint (arXiv:2402.08332v1), which has been superseded by the current version