Finding branch-decompositions of matroids, hypergraphs, and more

TL;DR

This paper introduces a fixed-parameter algorithm for constructing branch-decompositions of subspaces in vector spaces, generalizing several width parameters in graphs and matroids, and improves upon previous indirect methods.

Contribution

It develops a self-contained, generic framework for branch-decompositions of vector spaces, extending Bodlaender and Kloks' approach to a broader setting without relying on forbidden minors.

Findings

Algorithm constructs branch-decompositions of width at most k if they exist.

Runs in time comparable to previous algorithms for fixed k.

Provides a unified approach applicable to matroids, hypergraphs, and graphs.

Abstract

Given $n$ subspaces of a finite-dimensional vector space over a fixed finite field $\mathbb F$, we wish to find a "branch-decomposition" of these subspaces of width at most $k$ that is a subcubic tree $T$ with $n$ leaves mapped bijectively to the subspaces such that for every edge $e$ of $T$, the sum of subspaces associated to the leaves in one component of $T-e$ and the sum of subspaces associated to the leaves in the other component have the intersection of dimension at most $k$. This problem includes the problems of computing branch-width of $\mathbb F$-represented matroids, rank-width of graphs, branch-width of hypergraphs, and carving-width of graphs. We present a fixed-parameter algorithm to construct such a branch-decomposition of width at most $k$, if it exists, for input subspaces of a finite-dimensional vector space over $\mathbb F$. Our algorithm is analogous to the algorithm of Bodlaender and Kloks (1996) on tree-width of graphs. To extend their framework to branch-decompositions of vector spaces, we developed highly generic tools for branch-decompositions on vector spaces. The only known previous fixed-parameter algorithm for branch-width of $\mathbb F$-represented matroids was due to Hlin\v{e}n\'y and Oum (2008) that runs in time $O(n^3)$ where $n$ is the number of elements of the input $\mathbb F$-represented matroid. But their method is highly indirect. Their algorithm uses the nontrivial fact by Geelen et al. (2003) that the number of forbidden minors is finite and uses the algorithm of Hlin\v{e}n\'y (2006) on checking monadic second-order formulas on $\mathbb F$-represented matroids of small branch-width. Our result does not depend on such a fact and is completely self-contained, and yet matches their asymptotic running time for each fixed $k$.