What question did this study set out to answer?

The aim is to unify and refine existing tangle theorems for better graph analysis.

April 4, 2026Open Access

Optimal trees of tangles: refining the essential parts

Key Points

The aim is to unify and refine existing tangle theorems for better graph analysis.
Combined two fixed-order tangle theorems of Robertson and Seymour into a single theorem.
Analyzed tree-decompositions of graphs to distinguish k-tangles.
Developed a methodology for refining tree-decompositions based on size constraints.
Established that refined tree-decompositions are either too small for k-tangles or minimized for containing them.
Demonstrated the best possible implication of the combined tangle theorem.
Provided a new perspective on graph decomposition efficiency.

Abstract

We combine the two fundamental fixed-order tangle theorems of Robertson and Seymour into a single theorem that implies both, in a best possible way. We show that, for every k ∈ ℕ , every tree-decomposition of a graph G which efficiently distinguishes all its k -tangles can be refined to a tree-decomposition whose parts are either too small to be home to a k -tangle, or as small as possible while being home to a k -tangle.

Read Full Paperexternally

Mark Helpful

Bookmark

Relay

View Full Paper