Tree decompositions whose trees are subgraphs: An application of Simon's factorization

Abstract

We show that every connected graph G has a tree decomposition indexed by a tree T such that T is a subgraph of G and the width of the tree decomposition is bounded from above by a function of the pathwidth of G. This answers a question of Blanco, Cook, Hatzel, Hilaire, Illingworth, and McCarty (2024), who proved that it is not possible to have such a tree decomposition whose width is bounded by a function of the treewidth of G. The proof relies on Simon's Factorization Theorem for finite semigroups, a tool that has already been applied successfully in various areas of graph theory and combinatorics in recent years. Our application is particularly simple and can serve as a good introduction to this technique.