On vertex sets inducing tangles

Abstract

Diestel, Hundertmark and Lemanczyk asked whether every k-tangle in a graph is induced by a set of vertices by majority vote. We reduce their question to graphs whose size is bounded by a function in k. Additionally, we show that if for any fixed k this problem has a positive answer, then every k-tangle is induced by a vertex set whose size is bounded in k. More generally, we prove for all k that every k-tangle in a graph G is induced by a weight function V(G) N whose total weight is bounded in k. As the key step of our proofs, we show that any given k-tangle in a graph G is the lift of a k-tangle in some topological minor of G whose size is bounded in k.

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