Polynomial treewidth forces a large grid-like-minor

Abstract

Robertson and Seymour proved that every graph with sufficiently large treewidth contains a large grid minor. However, the best known bound on the treewidth that forces an × grid minor is exponential in . It is unknown whether polynomial treewidth suffices. We prove a result in this direction. A grid-like-minor of order in a graph G is a set of paths in G whose intersection graph is bipartite and contains a K-minor. For example, the rows and columns of the × grid are a grid-like-minor of order +1. We prove that polynomial treewidth forces a large grid-like-minor. In particular, every graph with treewidth at least c4 has a grid-like-minor of order . As an application of this result, we prove that the cartesian product G K2 contains a K-minor whenever G has treewidth at least c4.