Unavoidable minors for graphs with large p-dimension

Abstract

A metric graph is a pair (G,d), where G is a graph and d:E(G) ≥0 is a distance function. Let p ∈ [1,∞] be fixed. An isometric embedding of the metric graph (G,d) in pk = (Rk, dp) is a map φ : V(G) Rk such that dp(φ(v), φ(w)) = d(vw) for all edges vw∈ E(G). The p-dimension of G is the least integer k such that there exists an isometric embedding of (G,d) in pk for all distance functions d such that (G,d) has an isometric embedding in pK for some K. It is easy to show that p-dimension is a minor-monotone property. In this paper, we characterize the minor-closed graph classes C with bounded p-dimension, for p ∈ \2,∞\. For p=2, we give a simple proof that C has bounded 2-dimension if and only if C has bounded treewidth. In this sense, the 2-dimension of a graph is `tied' to its treewidth. For p=∞, the situation is completely different. Our main result states that a minor-closed class C has bounded ∞-dimension if and only if C excludes a graph obtained by joining copies of K4 using the 2-sum operation, or excludes a M\"obius ladder with one `horizontal edge' removed.