The excluded minors for isometric realizability in the plane

Abstract

Let G be a graph and p ∈ [1, ∞]. The parameter fp(G) is the least integer k such that for all m and all vectors (rv)v ∈ V(G) ⊂eq Rm, there exist vectors (qv)v ∈ V(G) ⊂eq Rk satisfying \|rv-rw\|p=\|qv-qw\|p, \ for all \ vw∈ E(G). It is easy to check that fp(G) is always finite and that it is minor monotone. By the graph minor theorem of Robertson and Seymour, there are a finite number of excluded minors for the property fp(G) ≤ k. In this paper, we determine the complete set of excluded minors for f∞(G) ≤ 2. The two excluded minors are the wheel on 5 vertices and the graph obtained by gluing two copies of K4 along an edge and then deleting that edge. We also show that the same two graphs are the complete set of excluded minors for f1(G) ≤ 2. In addition, we give a family of examples that show that f∞ is unbounded on the class of planar graphs and f∞ is not bounded as a function of tree-width.