Graph Minors and Minimum Degree

Abstract

Let Dk be the class of graphs for which every minor has minimum degree at most k. Then Dk is closed under taking minors. By the Robertson-Seymour graph minor theorem, Dk is characterised by a finite family of minor-minimal forbidden graphs, which we denote by Dk. This paper discusses Dk and related topics. We obtain four main results: We prove that every (k+1)-regular graph with less than 4/3(k+2) vertices is in Dk, and this bound is best possible. We characterise the graphs in Dk+1 that can be obtained from a graph in Dk by adding one new vertex. For k≤ 3 every graph in Dk is (k+1)-connected, but for large k, we exhibit graphs in Dk with connectivity 1. In fact, we construct graphs in Dk with arbitrary block structure. We characterise the complete multipartite graphs in Dk, and prove analogous characterisations with minimum degree replaced by connectivity, treewidth, or pathwidth.