Finding minors in graphs with a given path structure

Abstract

Given graphs G and H with V(G) containing V(H), suppose that we have a u,v-path Puv in G for each edge uv in H. There are obvious additional conditions that ensure that G contains H as a rooted subgraph, subdivision, or immersion; we seek conditions that ensure that G contains H as a rooted minor or minor. This naturally leads to studying sets of paths that form an H-immersion, with the additional property that paths that contain the same vertex must have a common endpoint. We say that H is contractible if, whenever G contains such an H-immersion, G must also contain a rooted H-minor. We show, for example, that forests, cycles, K4, and K1,1,3 are contractible, but that graphs that are not 6-colorable and graphs that contain certain subdivisions of K2,3 are not contractible.