English

Minor-matching hypertree width

Data Structures and Algorithms 2017-07-05 v2

Abstract

In this paper we present a new width measure for a tree decomposition, minor-matching hypertree width, μ-tw\mu\text{-}tw, for graphs and hypergraphs, such that bounding the width guarantees that set of maximal independent sets has a polynomially-sized restriction to each decomposition bag. The relaxed conditions of the decomposition allow a much wider class of graphs and hypergraphs of bounded width compared to other tree decompositions. We show that, for fixed kk, there are 2(11k+o(1))(n2)2^{(1 - \frac1k + o(1)){n \choose 2}} nn-vertex graphs of minor-matching hypertree width at most kk. A number of problems including Maximum Independence Set, kk-Colouring, and Homomorphism of uniform hypergraphs permit polynomial-time solutions for hypergraphs with bounded minor-matching hypertree width and bounded rank. We show that for any given kk and any graph GG, it is possible to construct a decomposition of minor-matching hypertree width at most O(k3)O(k^3), or to prove that μ-tw(G)>k\mu\text{-}tw(G) > k in time nO(k3)n^{O(k^3)}. This is done by presenting a general algorithm for approximating the hypertree width of well-behaved measures, and reducing μ-tw\mu\text{-}tw to such measure. The result relating the restriction of the maximal independent sets to a set SS with the set of induced matchings intersecting SS in graphs, and minor matchings intersecting SS in hypergraphs, might be of independent interest.

Keywords

Cite

@article{arxiv.1704.02939,
  title  = {Minor-matching hypertree width},
  author = {Nikola Yolov},
  journal= {arXiv preprint arXiv:1704.02939},
  year   = {2017}
}
R2 v1 2026-06-22T19:13:05.156Z