Graphs of bounded depth-2 rank-brittleness

Abstract

We characterize classes of graphs closed under taking vertex-minors and having no Pn and no disjoint union of n copies of the 1-subdivision of K1,n for some n. Our characterization is described in terms of a tree of radius 2 whose leaves are labelled by the vertices of a graph G, and the width is measured by the maximum possible cut-rank of a partition of V(G) induced by splitting an internal node of the tree to make two components. The minimum width possible is called the depth-2 rank-brittleness of G. We prove that for all n, every graph with sufficiently large depth-2 rank-brittleness contains Pn or disjoint union of n copies of the 1-subdivision of K1,n as a vertex-minor.